From: Ferruccio Guidi Date: Fri, 30 Jan 2015 13:49:49 +0000 (+0000) Subject: porting of basic_1 for the ng_kernel: first step ... X-Git-Tag: make_still_working~756 X-Git-Url: http://matita.cs.unibo.it/gitweb/?p=helm.git;a=commitdiff_plain;h=e51d01099c08e9945ea093da6fcac353db7ca23c porting of basic_1 for the ng_kernel: first step ... --- diff --git a/matita/matita/contribs/lambdadelta/Makefile b/matita/matita/contribs/lambdadelta/Makefile index 9b90b9997..cdd4f35b6 100644 --- a/matita/matita/contribs/lambdadelta/Makefile +++ b/matita/matita/contribs/lambdadelta/Makefile @@ -40,9 +40,6 @@ XPACKAGES := ground_2 basic_2 LDWS := $(shell find -name "*.ldw.xml") TBLS := $(shell find -name "*.tbl") -all: - ../../matitac.opt - # MAS ######################################################################## define MAS_TEMPLATE @@ -60,6 +57,10 @@ endef $(foreach PKG, $(PACKAGES), $(eval $(call MAS_TEMPLATE,$(PKG)))) +all: + @echo " MATITAC $(PACKAGES)" + $(H)../../matitac.opt $(MAS) + # XMAS ####################################################################### define XMAS_TEMPLATE diff --git a/matita/matita/contribs/lambdadelta/basic_1/preamble.ma b/matita/matita/contribs/lambdadelta/basic_1/preamble.ma index c9d6a172a..2354bcc2b 100644 --- a/matita/matita/contribs/lambdadelta/basic_1/preamble.ma +++ b/matita/matita/contribs/lambdadelta/basic_1/preamble.ma @@ -12,4 +12,4 @@ (* *) (**************************************************************************) -include "Ground-1/theory.ma". +include "ground_1/theory.ma". diff --git a/matita/matita/contribs/lambdadelta/ground_1/blt/defs.ma b/matita/matita/contribs/lambdadelta/ground_1/blt/defs.ma index 009627a3b..f1eee61f5 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/blt/defs.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/blt/defs.ma @@ -14,12 +14,9 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/preamble.ma". +include "ground_1/preamble.ma". -definition blt: - nat \to (nat \to bool) -\def - let rec blt (m: nat) (n: nat) on n: bool \def (match n with [O \Rightarrow +let rec blt (m: nat) (n: nat) on n: bool \def match n with [O \Rightarrow false | (S n0) \Rightarrow (match m with [O \Rightarrow true | (S m0) -\Rightarrow (blt m0 n0)])]) in blt. +\Rightarrow (blt m0 n0)])]. diff --git a/matita/matita/contribs/lambdadelta/ground_1/blt/props.ma b/matita/matita/contribs/lambdadelta/ground_1/blt/props.ma index e5b569925..689d6b45e 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/blt/props.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/blt/props.ma @@ -14,32 +14,27 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/blt/defs.ma". +include "ground_1/blt/defs.ma". theorem lt_blt: \forall (x: nat).(\forall (y: nat).((lt y x) \to (eq bool (blt y x) true))) \def \lambda (x: nat).(nat_ind (\lambda (n: nat).(\forall (y: nat).((lt y n) \to (eq bool (blt y n) true)))) (\lambda (y: nat).(\lambda (H: (lt y O)).(let H0 -\def (match H in le return (\lambda (n: nat).(\lambda (_: (le ? n)).((eq nat -n O) \to (eq bool (blt y O) true)))) with [le_n \Rightarrow (\lambda (H0: (eq -nat (S y) O)).(let H1 \def (eq_ind nat (S y) (\lambda (e: nat).(match e in -nat return (\lambda (_: nat).Prop) with [O \Rightarrow False | (S _) -\Rightarrow True])) I O H0) in (False_ind (eq bool (blt y O) true) H1))) | -(le_S m H0) \Rightarrow (\lambda (H1: (eq nat (S m) O)).((let H2 \def (eq_ind -nat (S m) (\lambda (e: nat).(match e in nat return (\lambda (_: nat).Prop) -with [O \Rightarrow False | (S _) \Rightarrow True])) I O H1) in (False_ind -((le (S y) m) \to (eq bool (blt y O) true)) H2)) H0))]) in (H0 (refl_equal -nat O))))) (\lambda (n: nat).(\lambda (H: ((\forall (y: nat).((lt y n) \to -(eq bool (blt y n) true))))).(\lambda (y: nat).(nat_ind (\lambda (n0: -nat).((lt n0 (S n)) \to (eq bool (blt n0 (S n)) true))) (\lambda (_: (lt O (S -n))).(refl_equal bool true)) (\lambda (n0: nat).(\lambda (_: (((lt n0 (S n)) -\to (eq bool (match n0 with [O \Rightarrow true | (S m) \Rightarrow (blt m -n)]) true)))).(\lambda (H1: (lt (S n0) (S n))).(H n0 (le_S_n (S n0) n H1))))) +\def (match H in le with [le_n \Rightarrow (\lambda (H0: (eq nat (S y) +O)).(let H1 \def (eq_ind nat (S y) (\lambda (e: nat).(match e in nat with [O +\Rightarrow False | (S _) \Rightarrow True])) I O H0) in (False_ind (eq bool +(blt y O) true) H1))) | (le_S m H0) \Rightarrow (\lambda (H1: (eq nat (S m) +O)).((let H2 \def (eq_ind nat (S m) (\lambda (e: nat).(match e in nat with [O +\Rightarrow False | (S _) \Rightarrow True])) I O H1) in (False_ind ((le (S +y) m) \to (eq bool (blt y O) true)) H2)) H0))]) in (H0 (refl_equal nat O))))) +(\lambda (n: nat).(\lambda (H: ((\forall (y: nat).((lt y n) \to (eq bool (blt +y n) true))))).(\lambda (y: nat).(nat_ind (\lambda (n0: nat).((lt n0 (S n)) +\to (eq bool (blt n0 (S n)) true))) (\lambda (_: (lt O (S n))).(refl_equal +bool true)) (\lambda (n0: nat).(\lambda (_: (((lt n0 (S n)) \to (eq bool +(match n0 with [O \Rightarrow true | (S m) \Rightarrow (blt m n)]) +true)))).(\lambda (H1: (lt (S n0) (S n))).(H n0 (le_S_n (S n0) n H1))))) y)))) x). -(* COMMENTS -Initial nodes: 291 -END *) theorem le_bge: \forall (x: nat).(\forall (y: nat).((le x y) \to (eq bool (blt y x) false))) @@ -49,44 +44,34 @@ theorem le_bge: y)).(refl_equal bool false))) (\lambda (n: nat).(\lambda (H: ((\forall (y: nat).((le n y) \to (eq bool (blt y n) false))))).(\lambda (y: nat).(nat_ind (\lambda (n0: nat).((le (S n) n0) \to (eq bool (blt n0 (S n)) false))) -(\lambda (H0: (le (S n) O)).(let H1 \def (match H0 in le return (\lambda (n0: -nat).(\lambda (_: (le ? n0)).((eq nat n0 O) \to (eq bool (blt O (S n)) -false)))) with [le_n \Rightarrow (\lambda (H1: (eq nat (S n) O)).(let H2 \def -(eq_ind nat (S n) (\lambda (e: nat).(match e in nat return (\lambda (_: -nat).Prop) with [O \Rightarrow False | (S _) \Rightarrow True])) I O H1) in -(False_ind (eq bool (blt O (S n)) false) H2))) | (le_S m H1) \Rightarrow -(\lambda (H2: (eq nat (S m) O)).((let H3 \def (eq_ind nat (S m) (\lambda (e: -nat).(match e in nat return (\lambda (_: nat).Prop) with [O \Rightarrow False +(\lambda (H0: (le (S n) O)).(let H1 \def (match H0 in le with [le_n +\Rightarrow (\lambda (H1: (eq nat (S n) O)).(let H2 \def (eq_ind nat (S n) +(\lambda (e: nat).(match e in nat with [O \Rightarrow False | (S _) +\Rightarrow True])) I O H1) in (False_ind (eq bool (blt O (S n)) false) H2))) +| (le_S m H1) \Rightarrow (\lambda (H2: (eq nat (S m) O)).((let H3 \def +(eq_ind nat (S m) (\lambda (e: nat).(match e in nat with [O \Rightarrow False | (S _) \Rightarrow True])) I O H2) in (False_ind ((le (S n) m) \to (eq bool (blt O (S n)) false)) H3)) H1))]) in (H1 (refl_equal nat O)))) (\lambda (n0: nat).(\lambda (_: (((le (S n) n0) \to (eq bool (blt n0 (S n)) false)))).(\lambda (H1: (le (S n) (S n0))).(H n0 (le_S_n n n0 H1))))) y)))) x). -(* COMMENTS -Initial nodes: 293 -END *) theorem blt_lt: \forall (x: nat).(\forall (y: nat).((eq bool (blt y x) true) \to (lt y x))) \def \lambda (x: nat).(nat_ind (\lambda (n: nat).(\forall (y: nat).((eq bool (blt y n) true) \to (lt y n)))) (\lambda (y: nat).(\lambda (H: (eq bool (blt y O) -true)).(let H0 \def (match H in eq return (\lambda (b: bool).(\lambda (_: (eq -? ? b)).((eq bool b true) \to (lt y O)))) with [refl_equal \Rightarrow -(\lambda (H0: (eq bool (blt y O) true)).(let H1 \def (eq_ind bool (blt y O) -(\lambda (e: bool).(match e in bool return (\lambda (_: bool).Prop) with -[true \Rightarrow False | false \Rightarrow True])) I true H0) in (False_ind -(lt y O) H1)))]) in (H0 (refl_equal bool true))))) (\lambda (n: nat).(\lambda -(H: ((\forall (y: nat).((eq bool (blt y n) true) \to (lt y n))))).(\lambda -(y: nat).(nat_ind (\lambda (n0: nat).((eq bool (blt n0 (S n)) true) \to (lt -n0 (S n)))) (\lambda (_: (eq bool true true)).(le_S_n (S O) (S n) (le_n_S (S -O) (S n) (le_n_S O n (le_O_n n))))) (\lambda (n0: nat).(\lambda (_: (((eq -bool (match n0 with [O \Rightarrow true | (S m) \Rightarrow (blt m n)]) true) -\to (lt n0 (S n))))).(\lambda (H1: (eq bool (blt n0 n) true)).(lt_n_S n0 n (H -n0 H1))))) y)))) x). -(* COMMENTS -Initial nodes: 252 -END *) +true)).(let H0 \def (match H in eq with [refl_equal \Rightarrow (\lambda (H0: +(eq bool (blt y O) true)).(let H1 \def (eq_ind bool (blt y O) (\lambda (e: +bool).(match e in bool with [true \Rightarrow False | false \Rightarrow +True])) I true H0) in (False_ind (lt y O) H1)))]) in (H0 (refl_equal bool +true))))) (\lambda (n: nat).(\lambda (H: ((\forall (y: nat).((eq bool (blt y +n) true) \to (lt y n))))).(\lambda (y: nat).(nat_ind (\lambda (n0: nat).((eq +bool (blt n0 (S n)) true) \to (lt n0 (S n)))) (\lambda (_: (eq bool true +true)).(le_S_n (S O) (S n) (le_n_S (S O) (S n) (le_n_S O n (le_O_n n))))) +(\lambda (n0: nat).(\lambda (_: (((eq bool (match n0 with [O \Rightarrow true +| (S m) \Rightarrow (blt m n)]) true) \to (lt n0 (S n))))).(\lambda (H1: (eq +bool (blt n0 n) true)).(lt_n_S n0 n (H n0 H1))))) y)))) x). theorem bge_le: \forall (x: nat).(\forall (y: nat).((eq bool (blt y x) false) \to (le x y))) @@ -96,17 +81,12 @@ y n) false) \to (le n y)))) (\lambda (y: nat).(\lambda (_: (eq bool (blt y O) false)).(le_O_n y))) (\lambda (n: nat).(\lambda (H: ((\forall (y: nat).((eq bool (blt y n) false) \to (le n y))))).(\lambda (y: nat).(nat_ind (\lambda (n0: nat).((eq bool (blt n0 (S n)) false) \to (le (S n) n0))) (\lambda (H0: -(eq bool (blt O (S n)) false)).(let H1 \def (match H0 in eq return (\lambda -(b: bool).(\lambda (_: (eq ? ? b)).((eq bool b false) \to (le (S n) O)))) -with [refl_equal \Rightarrow (\lambda (H1: (eq bool (blt O (S n)) -false)).(let H2 \def (eq_ind bool (blt O (S n)) (\lambda (e: bool).(match e -in bool return (\lambda (_: bool).Prop) with [true \Rightarrow True | false -\Rightarrow False])) I false H1) in (False_ind (le (S n) O) H2)))]) in (H1 -(refl_equal bool false)))) (\lambda (n0: nat).(\lambda (_: (((eq bool (blt n0 -(S n)) false) \to (le (S n) n0)))).(\lambda (H1: (eq bool (blt (S n0) (S n)) -false)).(le_S_n (S n) (S n0) (le_n_S (S n) (S n0) (le_n_S n n0 (H n0 -H1))))))) y)))) x). -(* COMMENTS -Initial nodes: 262 -END *) +(eq bool (blt O (S n)) false)).(let H1 \def (match H0 in eq with [refl_equal +\Rightarrow (\lambda (H1: (eq bool (blt O (S n)) false)).(let H2 \def (eq_ind +bool (blt O (S n)) (\lambda (e: bool).(match e in bool with [true \Rightarrow +True | false \Rightarrow False])) I false H1) in (False_ind (le (S n) O) +H2)))]) in (H1 (refl_equal bool false)))) (\lambda (n0: nat).(\lambda (_: +(((eq bool (blt n0 (S n)) false) \to (le (S n) n0)))).(\lambda (H1: (eq bool +(blt (S n0) (S n)) false)).(le_S_n (S n) (S n0) (le_n_S (S n) (S n0) (le_n_S +n n0 (H n0 H1))))))) y)))) x). diff --git a/matita/matita/contribs/lambdadelta/ground_1/definitions.ma b/matita/matita/contribs/lambdadelta/ground_1/definitions.ma index df31468aa..81a1e38f2 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/definitions.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/definitions.ma @@ -14,9 +14,9 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/types/defs.ma". +include "ground_1/types/defs.ma". -include "Ground-1/blt/defs.ma". +include "ground_1/blt/defs.ma". -include "Ground-1/plist/defs.ma". +include "ground_1/plist/defs.ma". diff --git a/matita/matita/contribs/lambdadelta/ground_1/ext/arith.ma b/matita/matita/contribs/lambdadelta/ground_1/ext/arith.ma index f9796e7fd..a0e72708f 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/ext/arith.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/ext/arith.ma @@ -14,7 +14,7 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/preamble.ma". +include "ground_1/preamble.ma". theorem nat_dec: \forall (n1: nat).(\forall (n2: nat).(or (eq nat n1 n2) ((eq nat n1 n2) \to @@ -28,36 +28,31 @@ Prop).P)) (refl_equal nat O)) (\lambda (n: nat).(\lambda (_: (or (eq nat O n) ((eq nat O n) \to (\forall (P: Prop).P)))).(or_intror (eq nat O (S n)) ((eq nat O (S n)) \to (\forall (P: Prop).P)) (\lambda (H0: (eq nat O (S n))).(\lambda (P: Prop).(let H1 \def (eq_ind nat O (\lambda (ee: nat).(match -ee in nat return (\lambda (_: nat).Prop) with [O \Rightarrow True | (S _) -\Rightarrow False])) I (S n) H0) in (False_ind P H1))))))) n2)) (\lambda (n: -nat).(\lambda (H: ((\forall (n2: nat).(or (eq nat n n2) ((eq nat n n2) \to -(\forall (P: Prop).P)))))).(\lambda (n2: nat).(nat_ind (\lambda (n0: nat).(or -(eq nat (S n) n0) ((eq nat (S n) n0) \to (\forall (P: Prop).P)))) (or_intror -(eq nat (S n) O) ((eq nat (S n) O) \to (\forall (P: Prop).P)) (\lambda (H0: -(eq nat (S n) O)).(\lambda (P: Prop).(let H1 \def (eq_ind nat (S n) (\lambda -(ee: nat).(match ee in nat return (\lambda (_: nat).Prop) with [O \Rightarrow -False | (S _) \Rightarrow True])) I O H0) in (False_ind P H1))))) (\lambda -(n0: nat).(\lambda (H0: (or (eq nat (S n) n0) ((eq nat (S n) n0) \to (\forall -(P: Prop).P)))).(or_ind (eq nat n n0) ((eq nat n n0) \to (\forall (P: -Prop).P)) (or (eq nat (S n) (S n0)) ((eq nat (S n) (S n0)) \to (\forall (P: -Prop).P))) (\lambda (H1: (eq nat n n0)).(let H2 \def (eq_ind_r nat n0 -(\lambda (n3: nat).(or (eq nat (S n) n3) ((eq nat (S n) n3) \to (\forall (P: -Prop).P)))) H0 n H1) in (eq_ind nat n (\lambda (n3: nat).(or (eq nat (S n) (S -n3)) ((eq nat (S n) (S n3)) \to (\forall (P: Prop).P)))) (or_introl (eq nat -(S n) (S n)) ((eq nat (S n) (S n)) \to (\forall (P: Prop).P)) (refl_equal nat -(S n))) n0 H1))) (\lambda (H1: (((eq nat n n0) \to (\forall (P: -Prop).P)))).(or_intror (eq nat (S n) (S n0)) ((eq nat (S n) (S n0)) \to -(\forall (P: Prop).P)) (\lambda (H2: (eq nat (S n) (S n0))).(\lambda (P: -Prop).(let H3 \def (f_equal nat nat (\lambda (e: nat).(match e in nat return -(\lambda (_: nat).nat) with [O \Rightarrow n | (S n3) \Rightarrow n3])) (S n) -(S n0) H2) in (let H4 \def (eq_ind_r nat n0 (\lambda (n3: nat).((eq nat n n3) -\to (\forall (P0: Prop).P0))) H1 n H3) in (let H5 \def (eq_ind_r nat n0 -(\lambda (n3: nat).(or (eq nat (S n) n3) ((eq nat (S n) n3) \to (\forall (P0: -Prop).P0)))) H0 n H3) in (H4 (refl_equal nat n) P)))))))) (H n0)))) n2)))) -n1). -(* COMMENTS -Initial nodes: 676 -END *) +ee in nat with [O \Rightarrow True | (S _) \Rightarrow False])) I (S n) H0) +in (False_ind P H1))))))) n2)) (\lambda (n: nat).(\lambda (H: ((\forall (n2: +nat).(or (eq nat n n2) ((eq nat n n2) \to (\forall (P: Prop).P)))))).(\lambda +(n2: nat).(nat_ind (\lambda (n0: nat).(or (eq nat (S n) n0) ((eq nat (S n) +n0) \to (\forall (P: Prop).P)))) (or_intror (eq nat (S n) O) ((eq nat (S n) +O) \to (\forall (P: Prop).P)) (\lambda (H0: (eq nat (S n) O)).(\lambda (P: +Prop).(let H1 \def (eq_ind nat (S n) (\lambda (ee: nat).(match ee in nat with +[O \Rightarrow False | (S _) \Rightarrow True])) I O H0) in (False_ind P +H1))))) (\lambda (n0: nat).(\lambda (H0: (or (eq nat (S n) n0) ((eq nat (S n) +n0) \to (\forall (P: Prop).P)))).(or_ind (eq nat n n0) ((eq nat n n0) \to +(\forall (P: Prop).P)) (or (eq nat (S n) (S n0)) ((eq nat (S n) (S n0)) \to +(\forall (P: Prop).P))) (\lambda (H1: (eq nat n n0)).(let H2 \def (eq_ind_r +nat n0 (\lambda (n3: nat).(or (eq nat (S n) n3) ((eq nat (S n) n3) \to +(\forall (P: Prop).P)))) H0 n H1) in (eq_ind nat n (\lambda (n3: nat).(or (eq +nat (S n) (S n3)) ((eq nat (S n) (S n3)) \to (\forall (P: Prop).P)))) +(or_introl (eq nat (S n) (S n)) ((eq nat (S n) (S n)) \to (\forall (P: +Prop).P)) (refl_equal nat (S n))) n0 H1))) (\lambda (H1: (((eq nat n n0) \to +(\forall (P: Prop).P)))).(or_intror (eq nat (S n) (S n0)) ((eq nat (S n) (S +n0)) \to (\forall (P: Prop).P)) (\lambda (H2: (eq nat (S n) (S n0))).(\lambda +(P: Prop).(let H3 \def (f_equal nat nat (\lambda (e: nat).(match e in nat +with [O \Rightarrow n | (S n3) \Rightarrow n3])) (S n) (S n0) H2) in (let H4 +\def (eq_ind_r nat n0 (\lambda (n3: nat).((eq nat n n3) \to (\forall (P0: +Prop).P0))) H1 n H3) in (let H5 \def (eq_ind_r nat n0 (\lambda (n3: nat).(or +(eq nat (S n) n3) ((eq nat (S n) n3) \to (\forall (P0: Prop).P0)))) H0 n H3) +in (H4 (refl_equal nat n) P)))))))) (H n0)))) n2)))) n1). theorem simpl_plus_r: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((eq nat (plus m n) @@ -66,28 +61,19 @@ theorem simpl_plus_r: \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (H: (eq nat (plus m n) (plus p n))).(simpl_plus_l n m p (eq_ind_r nat (plus m n) (\lambda (n0: nat).(eq nat n0 (plus n p))) (eq_ind_r nat (plus p n) (\lambda (n0: -nat).(eq nat n0 (plus n p))) (sym_eq nat (plus n p) (plus p n) (plus_sym n -p)) (plus m n) H) (plus n m) (plus_sym n m)))))). -(* COMMENTS -Initial nodes: 119 -END *) +nat).(eq nat n0 (plus n p))) (plus_sym p n) (plus m n) H) (plus n m) +(plus_sym n m)))))). theorem minus_Sx_Sy: \forall (x: nat).(\forall (y: nat).(eq nat (minus (S x) (S y)) (minus x y))) \def \lambda (x: nat).(\lambda (y: nat).(refl_equal nat (minus x y))). -(* COMMENTS -Initial nodes: 13 -END *) theorem minus_plus_r: \forall (m: nat).(\forall (n: nat).(eq nat (minus (plus m n) n) m)) \def \lambda (m: nat).(\lambda (n: nat).(eq_ind_r nat (plus n m) (\lambda (n0: nat).(eq nat (minus n0 n) m)) (minus_plus n m) (plus m n) (plus_sym m n))). -(* COMMENTS -Initial nodes: 45 -END *) theorem plus_permute_2_in_3: \forall (x: nat).(\forall (y: nat).(\forall (z: nat).(eq nat (plus (plus x @@ -99,9 +85,6 @@ y) z) (plus (plus x z) y)))) nat (plus (plus x z) y) (\lambda (n: nat).(eq nat n (plus (plus x z) y))) (refl_equal nat (plus (plus x z) y)) (plus x (plus z y)) (plus_assoc_r x z y)) (plus y z) (plus_sym y z)) (plus (plus x y) z) (plus_assoc_r x y z)))). -(* COMMENTS -Initial nodes: 163 -END *) theorem plus_permute_2_in_3_assoc: \forall (n: nat).(\forall (h: nat).(\forall (k: nat).(eq nat (plus (plus n @@ -112,9 +95,6 @@ h) k) (plus n (plus k h))))) nat (plus (plus n k) h) (\lambda (n0: nat).(eq nat (plus (plus n k) h) n0)) (refl_equal nat (plus (plus n k) h)) (plus n (plus k h)) (plus_assoc_l n k h)) (plus (plus n h) k) (plus_permute_2_in_3 n h k)))). -(* COMMENTS -Initial nodes: 119 -END *) theorem plus_O: \forall (x: nat).(\forall (y: nat).((eq nat (plus x y) O) \to (land (eq nat @@ -125,27 +105,19 @@ n y) O) \to (land (eq nat n O) (eq nat y O))))) (\lambda (y: nat).(\lambda (H: (eq nat (plus O y) O)).(conj (eq nat O O) (eq nat y O) (refl_equal nat O) H))) (\lambda (n: nat).(\lambda (_: ((\forall (y: nat).((eq nat (plus n y) O) \to (land (eq nat n O) (eq nat y O)))))).(\lambda (y: nat).(\lambda (H0: (eq -nat (plus (S n) y) O)).(let H1 \def (match H0 in eq return (\lambda (n0: -nat).(\lambda (_: (eq ? ? n0)).((eq nat n0 O) \to (land (eq nat (S n) O) (eq -nat y O))))) with [refl_equal \Rightarrow (\lambda (H1: (eq nat (plus (S n) -y) O)).(let H2 \def (eq_ind nat (plus (S n) y) (\lambda (e: nat).(match e in -nat return (\lambda (_: nat).Prop) with [O \Rightarrow False | (S _) -\Rightarrow True])) I O H1) in (False_ind (land (eq nat (S n) O) (eq nat y -O)) H2)))]) in (H1 (refl_equal nat O))))))) x). -(* COMMENTS -Initial nodes: 233 -END *) +nat (plus (S n) y) O)).(let H1 \def (match H0 in eq with [refl_equal +\Rightarrow (\lambda (H1: (eq nat (plus (S n) y) O)).(let H2 \def (eq_ind nat +(plus (S n) y) (\lambda (e: nat).(match e in nat with [O \Rightarrow False | +(S _) \Rightarrow True])) I O H1) in (False_ind (land (eq nat (S n) O) (eq +nat y O)) H2)))]) in (H1 (refl_equal nat O))))))) x). theorem minus_Sx_SO: \forall (x: nat).(eq nat (minus (S x) (S O)) x) \def \lambda (x: nat).(eq_ind nat x (\lambda (n: nat).(eq nat n x)) (refl_equal nat x) (minus x O) (minus_n_O x)). -(* COMMENTS -Initial nodes: 33 -END *) -theorem eq_nat_dec: +theorem nat_dec_neg: \forall (i: nat).(\forall (j: nat).(or (not (eq nat i j)) (eq nat i j))) \def \lambda (i: nat).(nat_ind (\lambda (n: nat).(\forall (j: nat).(or (not (eq @@ -163,9 +135,6 @@ nat n n0) (or (not (eq nat (S n) (S n0))) (eq nat (S n) (S n0))) (\lambda n) (S n0)) (not_eq_S n n0 H1))) (\lambda (H1: (eq nat n n0)).(or_intror (not (eq nat (S n) (S n0))) (eq nat (S n) (S n0)) (f_equal nat nat S n n0 H1))) (H n0)))) j)))) i). -(* COMMENTS -Initial nodes: 401 -END *) theorem neq_eq_e: \forall (i: nat).(\forall (j: nat).(\forall (P: Prop).((((not (eq nat i j)) @@ -173,10 +142,7 @@ theorem neq_eq_e: \def \lambda (i: nat).(\lambda (j: nat).(\lambda (P: Prop).(\lambda (H: (((not (eq nat i j)) \to P))).(\lambda (H0: (((eq nat i j) \to P))).(let o \def -(eq_nat_dec i j) in (or_ind (not (eq nat i j)) (eq nat i j) P H H0 o)))))). -(* COMMENTS -Initial nodes: 61 -END *) +(nat_dec_neg i j) in (or_ind (not (eq nat i j)) (eq nat i j) P H H0 o)))))). theorem le_false: \forall (m: nat).(\forall (n: nat).(\forall (P: Prop).((le m n) \to ((le (S @@ -185,42 +151,33 @@ n) m) \to P)))) \lambda (m: nat).(nat_ind (\lambda (n: nat).(\forall (n0: nat).(\forall (P: Prop).((le n n0) \to ((le (S n0) n) \to P))))) (\lambda (n: nat).(\lambda (P: Prop).(\lambda (_: (le O n)).(\lambda (H0: (le (S n) O)).(let H1 \def (match -H0 in le return (\lambda (n0: nat).(\lambda (_: (le ? n0)).((eq nat n0 O) \to -P))) with [le_n \Rightarrow (\lambda (H1: (eq nat (S n) O)).(let H2 \def -(eq_ind nat (S n) (\lambda (e: nat).(match e in nat return (\lambda (_: -nat).Prop) with [O \Rightarrow False | (S _) \Rightarrow True])) I O H1) in -(False_ind P H2))) | (le_S m0 H1) \Rightarrow (\lambda (H2: (eq nat (S m0) -O)).((let H3 \def (eq_ind nat (S m0) (\lambda (e: nat).(match e in nat return -(\lambda (_: nat).Prop) with [O \Rightarrow False | (S _) \Rightarrow True])) -I O H2) in (False_ind ((le (S n) m0) \to P) H3)) H1))]) in (H1 (refl_equal -nat O))))))) (\lambda (n: nat).(\lambda (H: ((\forall (n0: nat).(\forall (P: -Prop).((le n n0) \to ((le (S n0) n) \to P)))))).(\lambda (n0: nat).(nat_ind -(\lambda (n1: nat).(\forall (P: Prop).((le (S n) n1) \to ((le (S n1) (S n)) -\to P)))) (\lambda (P: Prop).(\lambda (H0: (le (S n) O)).(\lambda (_: (le (S -O) (S n))).(let H2 \def (match H0 in le return (\lambda (n1: nat).(\lambda -(_: (le ? n1)).((eq nat n1 O) \to P))) with [le_n \Rightarrow (\lambda (H2: -(eq nat (S n) O)).(let H3 \def (eq_ind nat (S n) (\lambda (e: nat).(match e -in nat return (\lambda (_: nat).Prop) with [O \Rightarrow False | (S _) +H0 in le with [le_n \Rightarrow (\lambda (H1: (eq nat (S n) O)).(let H2 \def +(eq_ind nat (S n) (\lambda (e: nat).(match e in nat with [O \Rightarrow False +| (S _) \Rightarrow True])) I O H1) in (False_ind P H2))) | (le_S m0 H1) +\Rightarrow (\lambda (H2: (eq nat (S m0) O)).((let H3 \def (eq_ind nat (S m0) +(\lambda (e: nat).(match e in nat with [O \Rightarrow False | (S _) +\Rightarrow True])) I O H2) in (False_ind ((le (S n) m0) \to P) H3)) H1))]) +in (H1 (refl_equal nat O))))))) (\lambda (n: nat).(\lambda (H: ((\forall (n0: +nat).(\forall (P: Prop).((le n n0) \to ((le (S n0) n) \to P)))))).(\lambda +(n0: nat).(nat_ind (\lambda (n1: nat).(\forall (P: Prop).((le (S n) n1) \to +((le (S n1) (S n)) \to P)))) (\lambda (P: Prop).(\lambda (H0: (le (S n) +O)).(\lambda (_: (le (S O) (S n))).(let H2 \def (match H0 in le with [le_n +\Rightarrow (\lambda (H2: (eq nat (S n) O)).(let H3 \def (eq_ind nat (S n) +(\lambda (e: nat).(match e in nat with [O \Rightarrow False | (S _) \Rightarrow True])) I O H2) in (False_ind P H3))) | (le_S m0 H2) \Rightarrow (\lambda (H3: (eq nat (S m0) O)).((let H4 \def (eq_ind nat (S m0) (\lambda -(e: nat).(match e in nat return (\lambda (_: nat).Prop) with [O \Rightarrow -False | (S _) \Rightarrow True])) I O H3) in (False_ind ((le (S n) m0) \to P) -H4)) H2))]) in (H2 (refl_equal nat O)))))) (\lambda (n1: nat).(\lambda (_: -((\forall (P: Prop).((le (S n) n1) \to ((le (S n1) (S n)) \to P))))).(\lambda -(P: Prop).(\lambda (H1: (le (S n) (S n1))).(\lambda (H2: (le (S (S n1)) (S +(e: nat).(match e in nat with [O \Rightarrow False | (S _) \Rightarrow +True])) I O H3) in (False_ind ((le (S n) m0) \to P) H4)) H2))]) in (H2 +(refl_equal nat O)))))) (\lambda (n1: nat).(\lambda (_: ((\forall (P: +Prop).((le (S n) n1) \to ((le (S n1) (S n)) \to P))))).(\lambda (P: +Prop).(\lambda (H1: (le (S n) (S n1))).(\lambda (H2: (le (S (S n1)) (S n))).(H n1 P (le_S_n n n1 H1) (le_S_n (S n1) n H2))))))) n0)))) m). -(* COMMENTS -Initial nodes: 409 -END *) theorem le_Sx_x: \forall (x: nat).((le (S x) x) \to (\forall (P: Prop).P)) \def \lambda (x: nat).(\lambda (H: (le (S x) x)).(\lambda (P: Prop).(let H0 \def le_Sn_n in (False_ind P (H0 x H))))). -(* COMMENTS -Initial nodes: 23 -END *) theorem le_n_pred: \forall (n: nat).(\forall (m: nat).((le n m) \to (le (pred n) (pred m)))) @@ -229,22 +186,16 @@ theorem le_n_pred: (n0: nat).(le (pred n) (pred n0))) (le_n (pred n)) (\lambda (m0: nat).(\lambda (_: (le n m0)).(\lambda (H1: (le (pred n) (pred m0))).(le_trans (pred n) (pred m0) m0 H1 (le_pred_n m0))))) m H))). -(* COMMENTS -Initial nodes: 71 -END *) theorem minus_le: \forall (x: nat).(\forall (y: nat).(le (minus x y) x)) \def \lambda (x: nat).(nat_ind (\lambda (n: nat).(\forall (y: nat).(le (minus n -y) n))) (\lambda (_: nat).(le_n O)) (\lambda (n: nat).(\lambda (H: ((\forall -(y: nat).(le (minus n y) n)))).(\lambda (y: nat).(nat_ind (\lambda (n0: -nat).(le (minus (S n) n0) (S n))) (le_n (S n)) (\lambda (n0: nat).(\lambda -(_: (le (match n0 with [O \Rightarrow (S n) | (S l) \Rightarrow (minus n l)]) -(S n))).(le_S (minus n n0) n (H n0)))) y)))) x). -(* COMMENTS -Initial nodes: 101 -END *) +y) n))) (\lambda (_: nat).(le_O_n O)) (\lambda (n: nat).(\lambda (H: +((\forall (y: nat).(le (minus n y) n)))).(\lambda (y: nat).(nat_ind (\lambda +(n0: nat).(le (minus (S n) n0) (S n))) (le_n (S n)) (\lambda (n0: +nat).(\lambda (_: (le (match n0 with [O \Rightarrow (S n) | (S l) \Rightarrow +(minus n l)]) (S n))).(le_S (minus n n0) n (H n0)))) y)))) x). theorem le_plus_minus_sym: \forall (n: nat).(\forall (m: nat).((le n m) \to (eq nat m (plus (minus m n) @@ -253,9 +204,6 @@ n)))) \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(eq_ind_r nat (plus n (minus m n)) (\lambda (n0: nat).(eq nat m n0)) (le_plus_minus n m H) (plus (minus m n) n) (plus_sym (minus m n) n)))). -(* COMMENTS -Initial nodes: 61 -END *) theorem le_minus_minus: \forall (x: nat).(\forall (y: nat).((le x y) \to (\forall (z: nat).((le y z) @@ -266,9 +214,6 @@ nat).(\lambda (H0: (le y z)).(simpl_le_plus_l x (minus y x) (minus z x) (eq_ind_r nat y (\lambda (n: nat).(le n (plus x (minus z x)))) (eq_ind_r nat z (\lambda (n: nat).(le y n)) H0 (plus x (minus z x)) (le_plus_minus_r x z (le_trans x y z H H0))) (plus x (minus y x)) (le_plus_minus_r x y H))))))). -(* COMMENTS -Initial nodes: 117 -END *) theorem le_minus_plus: \forall (z: nat).(\forall (x: nat).((le z x) \to (\forall (y: nat).(eq nat @@ -276,10 +221,8 @@ theorem le_minus_plus: \def \lambda (z: nat).(nat_ind (\lambda (n: nat).(\forall (x: nat).((le n x) \to (\forall (y: nat).(eq nat (minus (plus x y) n) (plus (minus x n) y)))))) -(\lambda (x: nat).(\lambda (H: (le O x)).(let H0 \def (match H in le return -(\lambda (n: nat).(\lambda (_: (le ? n)).((eq nat n x) \to (\forall (y: -nat).(eq nat (minus (plus x y) O) (plus (minus x O) y)))))) with [le_n -\Rightarrow (\lambda (H0: (eq nat O x)).(eq_ind nat O (\lambda (n: +(\lambda (x: nat).(\lambda (H: (le O x)).(let H0 \def (match H in le with +[le_n \Rightarrow (\lambda (H0: (eq nat O x)).(eq_ind nat O (\lambda (n: nat).(\forall (y: nat).(eq nat (minus (plus n y) O) (plus (minus n O) y)))) (\lambda (y: nat).(sym_eq nat (plus (minus O O) y) (minus (plus O y) O) (minus_n_O (plus O y)))) x H0)) | (le_S m H0) \Rightarrow (\lambda (H1: (eq @@ -291,23 +234,18 @@ nat).((le z0 x) \to (\forall (y: nat).(eq nat (minus (plus x y) z0) (plus (minus x z0) y))))))).(\lambda (x: nat).(nat_ind (\lambda (n: nat).((le (S z0) n) \to (\forall (y: nat).(eq nat (minus (plus n y) (S z0)) (plus (minus n (S z0)) y))))) (\lambda (H0: (le (S z0) O)).(\lambda (y: nat).(let H1 \def -(match H0 in le return (\lambda (n: nat).(\lambda (_: (le ? n)).((eq nat n O) -\to (eq nat (minus (plus O y) (S z0)) (plus (minus O (S z0)) y))))) with -[le_n \Rightarrow (\lambda (H1: (eq nat (S z0) O)).(let H2 \def (eq_ind nat -(S z0) (\lambda (e: nat).(match e in nat return (\lambda (_: nat).Prop) with -[O \Rightarrow False | (S _) \Rightarrow True])) I O H1) in (False_ind (eq -nat (minus (plus O y) (S z0)) (plus (minus O (S z0)) y)) H2))) | (le_S m H1) +(match H0 in le with [le_n \Rightarrow (\lambda (H1: (eq nat (S z0) O)).(let +H2 \def (eq_ind nat (S z0) (\lambda (e: nat).(match e in nat with [O +\Rightarrow False | (S _) \Rightarrow True])) I O H1) in (False_ind (eq nat +(minus (plus O y) (S z0)) (plus (minus O (S z0)) y)) H2))) | (le_S m H1) \Rightarrow (\lambda (H2: (eq nat (S m) O)).((let H3 \def (eq_ind nat (S m) -(\lambda (e: nat).(match e in nat return (\lambda (_: nat).Prop) with [O -\Rightarrow False | (S _) \Rightarrow True])) I O H2) in (False_ind ((le (S -z0) m) \to (eq nat (minus (plus O y) (S z0)) (plus (minus O (S z0)) y))) H3)) -H1))]) in (H1 (refl_equal nat O))))) (\lambda (n: nat).(\lambda (_: (((le (S -z0) n) \to (\forall (y: nat).(eq nat (minus (plus n y) (S z0)) (plus (minus n -(S z0)) y)))))).(\lambda (H1: (le (S z0) (S n))).(\lambda (y: nat).(H n -(le_S_n z0 n H1) y))))) x)))) z). -(* COMMENTS -Initial nodes: 603 -END *) +(\lambda (e: nat).(match e in nat with [O \Rightarrow False | (S _) +\Rightarrow True])) I O H2) in (False_ind ((le (S z0) m) \to (eq nat (minus +(plus O y) (S z0)) (plus (minus O (S z0)) y))) H3)) H1))]) in (H1 (refl_equal +nat O))))) (\lambda (n: nat).(\lambda (_: (((le (S z0) n) \to (\forall (y: +nat).(eq nat (minus (plus n y) (S z0)) (plus (minus n (S z0)) +y)))))).(\lambda (H1: (le (S z0) (S n))).(\lambda (y: nat).(H n (le_S_n z0 n +H1) y))))) x)))) z). theorem le_minus: \forall (x: nat).(\forall (z: nat).(\forall (y: nat).((le (plus x y) z) \to @@ -317,9 +255,6 @@ theorem le_minus: x y) z)).(eq_ind nat (minus (plus x y) y) (\lambda (n: nat).(le n (minus z y))) (le_minus_minus y (plus x y) (le_plus_r x y) z H) x (minus_plus_r x y))))). -(* COMMENTS -Initial nodes: 69 -END *) theorem le_trans_plus_r: \forall (x: nat).(\forall (y: nat).(\forall (z: nat).((le (plus x y) z) \to @@ -327,30 +262,22 @@ theorem le_trans_plus_r: \def \lambda (x: nat).(\lambda (y: nat).(\lambda (z: nat).(\lambda (H: (le (plus x y) z)).(le_trans y (plus x y) z (le_plus_r x y) H)))). -(* COMMENTS -Initial nodes: 35 -END *) theorem lt_x_O: \forall (x: nat).((lt x O) \to (\forall (P: Prop).P)) \def \lambda (x: nat).(\lambda (H: (le (S x) O)).(\lambda (P: Prop).(let H_y \def (le_n_O_eq (S x) H) in (let H0 \def (eq_ind nat O (\lambda (ee: nat).(match -ee in nat return (\lambda (_: nat).Prop) with [O \Rightarrow True | (S _) -\Rightarrow False])) I (S x) H_y) in (False_ind P H0))))). -(* COMMENTS -Initial nodes: 48 -END *) +ee in nat with [O \Rightarrow True | (S _) \Rightarrow False])) I (S x) H_y) +in (False_ind P H0))))). theorem le_gen_S: \forall (m: nat).(\forall (x: nat).((le (S m) x) \to (ex2 nat (\lambda (n: nat).(eq nat x (S n))) (\lambda (n: nat).(le m n))))) \def \lambda (m: nat).(\lambda (x: nat).(\lambda (H: (le (S m) x)).(let H0 \def -(match H in le return (\lambda (n: nat).(\lambda (_: (le ? n)).((eq nat n x) -\to (ex2 nat (\lambda (n0: nat).(eq nat x (S n0))) (\lambda (n0: nat).(le m -n0)))))) with [le_n \Rightarrow (\lambda (H0: (eq nat (S m) x)).(eq_ind nat -(S m) (\lambda (n: nat).(ex2 nat (\lambda (n0: nat).(eq nat n (S n0))) +(match H in le with [le_n \Rightarrow (\lambda (H0: (eq nat (S m) x)).(eq_ind +nat (S m) (\lambda (n: nat).(ex2 nat (\lambda (n0: nat).(eq nat n (S n0))) (\lambda (n0: nat).(le m n0)))) (ex_intro2 nat (\lambda (n: nat).(eq nat (S m) (S n))) (\lambda (n: nat).(le m n)) m (refl_equal nat (S m)) (le_n m)) x H0)) | (le_S m0 H0) \Rightarrow (\lambda (H1: (eq nat (S m0) x)).(eq_ind nat @@ -359,9 +286,6 @@ nat n (S n0))) (\lambda (n0: nat).(le m n0))))) (\lambda (H2: (le (S m) m0)).(ex_intro2 nat (\lambda (n: nat).(eq nat (S m0) (S n))) (\lambda (n: nat).(le m n)) m0 (refl_equal nat (S m0)) (le_S_n m m0 (le_S (S m) m0 H2)))) x H1 H0))]) in (H0 (refl_equal nat x))))). -(* COMMENTS -Initial nodes: 261 -END *) theorem lt_x_plus_x_Sy: \forall (x: nat).(\forall (y: nat).(lt x (plus x (S y)))) @@ -369,9 +293,6 @@ theorem lt_x_plus_x_Sy: \lambda (x: nat).(\lambda (y: nat).(eq_ind_r nat (plus (S y) x) (\lambda (n: nat).(lt x n)) (le_S_n (S x) (S (plus y x)) (le_n_S (S x) (S (plus y x)) (le_n_S x (plus y x) (le_plus_r y x)))) (plus x (S y)) (plus_sym x (S y)))). -(* COMMENTS -Initial nodes: 83 -END *) theorem simpl_lt_plus_r: \forall (p: nat).(\forall (n: nat).(\forall (m: nat).((lt (plus n p) (plus m @@ -382,9 +303,6 @@ n p) (plus m p))).(simpl_lt_plus_l n m p (let H0 \def (eq_ind nat (plus n p) (\lambda (n0: nat).(lt n0 (plus m p))) H (plus p n) (plus_sym n p)) in (let H1 \def (eq_ind nat (plus m p) (\lambda (n0: nat).(lt (plus p n) n0)) H0 (plus p m) (plus_sym m p)) in H1)))))). -(* COMMENTS -Initial nodes: 101 -END *) theorem minus_x_Sy: \forall (x: nat).(\forall (y: nat).((lt y x) \to (eq nat (minus x y) (S @@ -392,27 +310,22 @@ theorem minus_x_Sy: \def \lambda (x: nat).(nat_ind (\lambda (n: nat).(\forall (y: nat).((lt y n) \to (eq nat (minus n y) (S (minus n (S y))))))) (\lambda (y: nat).(\lambda (H: -(lt y O)).(let H0 \def (match H in le return (\lambda (n: nat).(\lambda (_: -(le ? n)).((eq nat n O) \to (eq nat (minus O y) (S (minus O (S y))))))) with -[le_n \Rightarrow (\lambda (H0: (eq nat (S y) O)).(let H1 \def (eq_ind nat (S -y) (\lambda (e: nat).(match e in nat return (\lambda (_: nat).Prop) with [O -\Rightarrow False | (S _) \Rightarrow True])) I O H0) in (False_ind (eq nat -(minus O y) (S (minus O (S y)))) H1))) | (le_S m H0) \Rightarrow (\lambda -(H1: (eq nat (S m) O)).((let H2 \def (eq_ind nat (S m) (\lambda (e: -nat).(match e in nat return (\lambda (_: nat).Prop) with [O \Rightarrow False -| (S _) \Rightarrow True])) I O H1) in (False_ind ((le (S y) m) \to (eq nat -(minus O y) (S (minus O (S y))))) H2)) H0))]) in (H0 (refl_equal nat O))))) -(\lambda (n: nat).(\lambda (H: ((\forall (y: nat).((lt y n) \to (eq nat -(minus n y) (S (minus n (S y)))))))).(\lambda (y: nat).(nat_ind (\lambda (n0: -nat).((lt n0 (S n)) \to (eq nat (minus (S n) n0) (S (minus (S n) (S n0)))))) -(\lambda (_: (lt O (S n))).(eq_ind nat n (\lambda (n0: nat).(eq nat (S n) (S -n0))) (refl_equal nat (S n)) (minus n O) (minus_n_O n))) (\lambda (n0: +(lt y O)).(let H0 \def (match H in le with [le_n \Rightarrow (\lambda (H0: +(eq nat (S y) O)).(let H1 \def (eq_ind nat (S y) (\lambda (e: nat).(match e +in nat with [O \Rightarrow False | (S _) \Rightarrow True])) I O H0) in +(False_ind (eq nat (minus O y) (S (minus O (S y)))) H1))) | (le_S m H0) +\Rightarrow (\lambda (H1: (eq nat (S m) O)).((let H2 \def (eq_ind nat (S m) +(\lambda (e: nat).(match e in nat with [O \Rightarrow False | (S _) +\Rightarrow True])) I O H1) in (False_ind ((le (S y) m) \to (eq nat (minus O +y) (S (minus O (S y))))) H2)) H0))]) in (H0 (refl_equal nat O))))) (\lambda +(n: nat).(\lambda (H: ((\forall (y: nat).((lt y n) \to (eq nat (minus n y) (S +(minus n (S y)))))))).(\lambda (y: nat).(nat_ind (\lambda (n0: nat).((lt n0 +(S n)) \to (eq nat (minus (S n) n0) (S (minus (S n) (S n0)))))) (\lambda (_: +(lt O (S n))).(eq_ind nat n (\lambda (n0: nat).(eq nat (S n) (S n0))) +(refl_equal nat (S n)) (minus n O) (minus_n_O n))) (\lambda (n0: nat).(\lambda (_: (((lt n0 (S n)) \to (eq nat (minus (S n) n0) (S (minus (S n) (S n0))))))).(\lambda (H1: (lt (S n0) (S n))).(let H2 \def (le_S_n (S n0) n H1) in (H n0 H2))))) y)))) x). -(* COMMENTS -Initial nodes: 383 -END *) theorem lt_plus_minus: \forall (x: nat).(\forall (y: nat).((lt x y) \to (eq nat y (S (plus x (minus @@ -420,9 +333,6 @@ y (S x))))))) \def \lambda (x: nat).(\lambda (y: nat).(\lambda (H: (lt x y)).(le_plus_minus (S x) y H))). -(* COMMENTS -Initial nodes: 19 -END *) theorem lt_plus_minus_r: \forall (x: nat).(\forall (y: nat).((lt x y) \to (eq nat y (S (plus (minus y @@ -431,9 +341,6 @@ theorem lt_plus_minus_r: \lambda (x: nat).(\lambda (y: nat).(\lambda (H: (lt x y)).(eq_ind_r nat (plus x (minus y (S x))) (\lambda (n: nat).(eq nat y (S n))) (lt_plus_minus x y H) (plus (minus y (S x)) x) (plus_sym (minus y (S x)) x)))). -(* COMMENTS -Initial nodes: 69 -END *) theorem minus_x_SO: \forall (x: nat).((lt O x) \to (eq nat x (S (minus x (S O))))) @@ -441,29 +348,21 @@ theorem minus_x_SO: \lambda (x: nat).(\lambda (H: (lt O x)).(eq_ind nat (minus x O) (\lambda (n: nat).(eq nat x n)) (eq_ind nat x (\lambda (n: nat).(eq nat x n)) (refl_equal nat x) (minus x O) (minus_n_O x)) (S (minus x (S O))) (minus_x_Sy x O H))). -(* COMMENTS -Initial nodes: 77 -END *) theorem le_x_pred_y: \forall (y: nat).(\forall (x: nat).((lt x y) \to (le x (pred y)))) \def \lambda (y: nat).(nat_ind (\lambda (n: nat).(\forall (x: nat).((lt x n) \to (le x (pred n))))) (\lambda (x: nat).(\lambda (H: (lt x O)).(let H0 \def -(match H in le return (\lambda (n: nat).(\lambda (_: (le ? n)).((eq nat n O) -\to (le x O)))) with [le_n \Rightarrow (\lambda (H0: (eq nat (S x) O)).(let -H1 \def (eq_ind nat (S x) (\lambda (e: nat).(match e in nat return (\lambda -(_: nat).Prop) with [O \Rightarrow False | (S _) \Rightarrow True])) I O H0) -in (False_ind (le x O) H1))) | (le_S m H0) \Rightarrow (\lambda (H1: (eq nat -(S m) O)).((let H2 \def (eq_ind nat (S m) (\lambda (e: nat).(match e in nat -return (\lambda (_: nat).Prop) with [O \Rightarrow False | (S _) \Rightarrow -True])) I O H1) in (False_ind ((le (S x) m) \to (le x O)) H2)) H0))]) in (H0 -(refl_equal nat O))))) (\lambda (n: nat).(\lambda (_: ((\forall (x: nat).((lt -x n) \to (le x (pred n)))))).(\lambda (x: nat).(\lambda (H0: (lt x (S -n))).(le_S_n x n H0))))) y). -(* COMMENTS -Initial nodes: 189 -END *) +(match H in le with [le_n \Rightarrow (\lambda (H0: (eq nat (S x) O)).(let H1 +\def (eq_ind nat (S x) (\lambda (e: nat).(match e in nat with [O \Rightarrow +False | (S _) \Rightarrow True])) I O H0) in (False_ind (le x O) H1))) | +(le_S m H0) \Rightarrow (\lambda (H1: (eq nat (S m) O)).((let H2 \def (eq_ind +nat (S m) (\lambda (e: nat).(match e in nat with [O \Rightarrow False | (S _) +\Rightarrow True])) I O H1) in (False_ind ((le (S x) m) \to (le x O)) H2)) +H0))]) in (H0 (refl_equal nat O))))) (\lambda (n: nat).(\lambda (_: ((\forall +(x: nat).((lt x n) \to (le x (pred n)))))).(\lambda (x: nat).(\lambda (H0: +(lt x (S n))).(le_S_n x n H0))))) y). theorem lt_le_minus: \forall (x: nat).(\forall (y: nat).((lt x y) \to (le x (minus y (S O))))) @@ -471,9 +370,6 @@ theorem lt_le_minus: \lambda (x: nat).(\lambda (y: nat).(\lambda (H: (lt x y)).(le_minus x y (S O) (eq_ind_r nat (plus (S O) x) (\lambda (n: nat).(le n y)) H (plus x (S O)) (plus_sym x (S O)))))). -(* COMMENTS -Initial nodes: 57 -END *) theorem lt_le_e: \forall (n: nat).(\forall (d: nat).(\forall (P: Prop).((((lt n d) \to P)) @@ -482,9 +378,6 @@ theorem lt_le_e: \lambda (n: nat).(\lambda (d: nat).(\lambda (P: Prop).(\lambda (H: (((lt n d) \to P))).(\lambda (H0: (((le d n) \to P))).(let H1 \def (le_or_lt d n) in (or_ind (le d n) (lt n d) P H0 H H1)))))). -(* COMMENTS -Initial nodes: 49 -END *) theorem lt_eq_e: \forall (x: nat).(\forall (y: nat).(\forall (P: Prop).((((lt x y) \to P)) @@ -493,9 +386,6 @@ theorem lt_eq_e: \lambda (x: nat).(\lambda (y: nat).(\lambda (P: Prop).(\lambda (H: (((lt x y) \to P))).(\lambda (H0: (((eq nat x y) \to P))).(\lambda (H1: (le x y)).(or_ind (lt x y) (eq nat x y) P H H0 (le_lt_or_eq x y H1))))))). -(* COMMENTS -Initial nodes: 59 -END *) theorem lt_eq_gt_e: \forall (x: nat).(\forall (y: nat).(\forall (P: Prop).((((lt x y) \to P)) @@ -505,9 +395,6 @@ theorem lt_eq_gt_e: y) \to P))).(\lambda (H0: (((eq nat x y) \to P))).(\lambda (H1: (((lt y x) \to P))).(lt_le_e x y P H (\lambda (H2: (le y x)).(lt_eq_e y x P H1 (\lambda (H3: (eq nat y x)).(H0 (sym_eq nat y x H3))) H2)))))))). -(* COMMENTS -Initial nodes: 79 -END *) theorem lt_gen_xS: \forall (x: nat).(\forall (n: nat).((lt x (S n)) \to (or (eq nat x O) (ex2 @@ -524,9 +411,6 @@ nat).(\lambda (H0: (lt (S n) (S n0))).(or_intror (eq nat (S n) O) (ex2 nat (\lambda (m: nat).(eq nat (S n) (S m))) (\lambda (m: nat).(lt m n0))) (ex_intro2 nat (\lambda (m: nat).(eq nat (S n) (S m))) (\lambda (m: nat).(lt m n0)) n (refl_equal nat (S n)) (le_S_n (S n) n0 H0))))))) x). -(* COMMENTS -Initial nodes: 243 -END *) theorem le_lt_false: \forall (x: nat).(\forall (y: nat).((le x y) \to ((lt y x) \to (\forall (P: @@ -534,9 +418,6 @@ Prop).P)))) \def \lambda (x: nat).(\lambda (y: nat).(\lambda (H: (le x y)).(\lambda (H0: (lt y x)).(\lambda (P: Prop).(False_ind P (le_not_lt x y H H0)))))). -(* COMMENTS -Initial nodes: 31 -END *) theorem lt_neq: \forall (x: nat).(\forall (y: nat).((lt x y) \to (not (eq nat x y)))) @@ -544,9 +425,6 @@ theorem lt_neq: \lambda (x: nat).(\lambda (y: nat).(\lambda (H: (lt x y)).(\lambda (H0: (eq nat x y)).(let H1 \def (eq_ind nat x (\lambda (n: nat).(lt n y)) H y H0) in (lt_n_n y H1))))). -(* COMMENTS -Initial nodes: 43 -END *) theorem arith0: \forall (h2: nat).(\forall (d2: nat).(\forall (n: nat).((le (plus d2 h2) n) @@ -562,9 +440,6 @@ h2) (\lambda (n0: nat).(le n0 (minus (plus n h1) h2))) (le_minus_minus h2 (le_plus_plus (plus d2 h2) n h1 h1 H (le_n h1)))) (plus h2 d2) (plus_sym h2 d2)) (plus h2 (plus d2 h1)) (plus_assoc_l h2 d2 h1))) (plus d2 h1) (minus_plus h2 (plus d2 h1))))))). -(* COMMENTS -Initial nodes: 235 -END *) theorem O_minus: \forall (x: nat).(\forall (y: nat).((le x y) \to (eq nat (minus x y) O))) @@ -578,15 +453,11 @@ x0) | (S l) \Rightarrow (minus x0 l)]) O))) (\lambda (H0: (le (S x0) O)).(ex2_ind nat (\lambda (n: nat).(eq nat O (S n))) (\lambda (n: nat).(le x0 n)) (eq nat (S x0) O) (\lambda (x1: nat).(\lambda (H1: (eq nat O (S x1))).(\lambda (_: (le x0 x1)).(let H3 \def (eq_ind nat O (\lambda (ee: -nat).(match ee in nat return (\lambda (_: nat).Prop) with [O \Rightarrow True -| (S _) \Rightarrow False])) I (S x1) H1) in (False_ind (eq nat (S x0) O) -H3))))) (le_gen_S x0 O H0))) (\lambda (n: nat).(\lambda (_: (((le (S x0) n) -\to (eq nat (match n with [O \Rightarrow (S x0) | (S l) \Rightarrow (minus x0 -l)]) O)))).(\lambda (H1: (le (S x0) (S n))).(H n (le_S_n x0 n H1))))) y)))) -x). -(* COMMENTS -Initial nodes: 252 -END *) +nat).(match ee in nat with [O \Rightarrow True | (S _) \Rightarrow False])) I +(S x1) H1) in (False_ind (eq nat (S x0) O) H3))))) (le_gen_S x0 O H0))) +(\lambda (n: nat).(\lambda (_: (((le (S x0) n) \to (eq nat (match n with [O +\Rightarrow (S x0) | (S l) \Rightarrow (minus x0 l)]) O)))).(\lambda (H1: (le +(S x0) (S n))).(H n (le_S_n x0 n H1))))) y)))) x). theorem minus_minus: \forall (z: nat).(\forall (x: nat).(\forall (y: nat).((le z x) \to ((le z y) @@ -608,29 +479,25 @@ y)))))))).(\lambda (x: nat).(nat_ind (\lambda (n: nat).(\forall (y: nat).((le z0)))).(ex2_ind nat (\lambda (n: nat).(eq nat O (S n))) (\lambda (n: nat).(le z0 n)) (eq nat O y) (\lambda (x0: nat).(\lambda (H2: (eq nat O (S x0))).(\lambda (_: (le z0 x0)).(let H4 \def (eq_ind nat O (\lambda (ee: -nat).(match ee in nat return (\lambda (_: nat).Prop) with [O \Rightarrow True -| (S _) \Rightarrow False])) I (S x0) H2) in (False_ind (eq nat O y) H4))))) -(le_gen_S z0 O H)))))) (\lambda (x0: nat).(\lambda (_: ((\forall (y: -nat).((le (S z0) x0) \to ((le (S z0) y) \to ((eq nat (minus x0 (S z0)) (minus -y (S z0))) \to (eq nat x0 y))))))).(\lambda (y: nat).(nat_ind (\lambda (n: -nat).((le (S z0) (S x0)) \to ((le (S z0) n) \to ((eq nat (minus (S x0) (S -z0)) (minus n (S z0))) \to (eq nat (S x0) n))))) (\lambda (H: (le (S z0) (S -x0))).(\lambda (H0: (le (S z0) O)).(\lambda (_: (eq nat (minus (S x0) (S z0)) -(minus O (S z0)))).(let H_y \def (le_S_n z0 x0 H) in (ex2_ind nat (\lambda -(n: nat).(eq nat O (S n))) (\lambda (n: nat).(le z0 n)) (eq nat (S x0) O) -(\lambda (x1: nat).(\lambda (H2: (eq nat O (S x1))).(\lambda (_: (le z0 -x1)).(let H4 \def (eq_ind nat O (\lambda (ee: nat).(match ee in nat return -(\lambda (_: nat).Prop) with [O \Rightarrow True | (S _) \Rightarrow False])) -I (S x1) H2) in (False_ind (eq nat (S x0) O) H4))))) (le_gen_S z0 O H0)))))) -(\lambda (y0: nat).(\lambda (_: (((le (S z0) (S x0)) \to ((le (S z0) y0) \to -((eq nat (minus (S x0) (S z0)) (minus y0 (S z0))) \to (eq nat (S x0) -y0)))))).(\lambda (H: (le (S z0) (S x0))).(\lambda (H0: (le (S z0) (S -y0))).(\lambda (H1: (eq nat (minus (S x0) (S z0)) (minus (S y0) (S +nat).(match ee in nat with [O \Rightarrow True | (S _) \Rightarrow False])) I +(S x0) H2) in (False_ind (eq nat O y) H4))))) (le_gen_S z0 O H)))))) (\lambda +(x0: nat).(\lambda (_: ((\forall (y: nat).((le (S z0) x0) \to ((le (S z0) y) +\to ((eq nat (minus x0 (S z0)) (minus y (S z0))) \to (eq nat x0 +y))))))).(\lambda (y: nat).(nat_ind (\lambda (n: nat).((le (S z0) (S x0)) \to +((le (S z0) n) \to ((eq nat (minus (S x0) (S z0)) (minus n (S z0))) \to (eq +nat (S x0) n))))) (\lambda (H: (le (S z0) (S x0))).(\lambda (H0: (le (S z0) +O)).(\lambda (_: (eq nat (minus (S x0) (S z0)) (minus O (S z0)))).(let H_y +\def (le_S_n z0 x0 H) in (ex2_ind nat (\lambda (n: nat).(eq nat O (S n))) +(\lambda (n: nat).(le z0 n)) (eq nat (S x0) O) (\lambda (x1: nat).(\lambda +(H2: (eq nat O (S x1))).(\lambda (_: (le z0 x1)).(let H4 \def (eq_ind nat O +(\lambda (ee: nat).(match ee in nat with [O \Rightarrow True | (S _) +\Rightarrow False])) I (S x1) H2) in (False_ind (eq nat (S x0) O) H4))))) +(le_gen_S z0 O H0)))))) (\lambda (y0: nat).(\lambda (_: (((le (S z0) (S x0)) +\to ((le (S z0) y0) \to ((eq nat (minus (S x0) (S z0)) (minus y0 (S z0))) \to +(eq nat (S x0) y0)))))).(\lambda (H: (le (S z0) (S x0))).(\lambda (H0: (le (S +z0) (S y0))).(\lambda (H1: (eq nat (minus (S x0) (S z0)) (minus (S y0) (S z0)))).(f_equal nat nat S x0 y0 (IH x0 y0 (le_S_n z0 x0 H) (le_S_n z0 y0 H0) H1))))))) y)))) x)))) z). -(* COMMENTS -Initial nodes: 751 -END *) theorem plus_plus: \forall (z: nat).(\forall (x1: nat).(\forall (x2: nat).(\forall (y1: @@ -706,9 +573,6 @@ z0))).(\lambda (H0: (le (S x4) (S z0))).(\lambda (H1: (eq nat (plus (minus z0 x2) y1) (plus (minus z0 x4) y2))).(f_equal nat nat S (plus x2 y2) (plus x4 y1) (IH x2 x4 y1 y2 (le_S_n x2 z0 H) (le_S_n x4 z0 H0) H1))))))))) x3)))) x1)))) z). -(* COMMENTS -Initial nodes: 1495 -END *) theorem le_S_minus: \forall (d: nat).(\forall (h: nat).(\forall (n: nat).((le (plus d h) n) \to @@ -719,9 +583,6 @@ d h) n)).(let H0 \def (le_trans d (plus d h) n (le_plus_l d h) H) in (let H1 \def (eq_ind nat n (\lambda (n0: nat).(le d n0)) H0 (plus (minus n h) h) (le_plus_minus_sym h n (le_trans h (plus d h) n (le_plus_r d h) H))) in (le_S d (minus n h) (le_minus d n h H))))))). -(* COMMENTS -Initial nodes: 107 -END *) theorem lt_x_pred_y: \forall (x: nat).(\forall (y: nat).((lt x (pred y)) \to (lt (S x) y))) @@ -729,9 +590,5 @@ theorem lt_x_pred_y: \lambda (x: nat).(\lambda (y: nat).(nat_ind (\lambda (n: nat).((lt x (pred n)) \to (lt (S x) n))) (\lambda (H: (lt x O)).(lt_x_O x H (lt (S x) O))) (\lambda (n: nat).(\lambda (_: (((lt x (pred n)) \to (lt (S x) n)))).(\lambda -(H0: (lt x n)).(le_S_n (S (S x)) (S n) (le_n_S (S (S x)) (S n) (le_n_S (S x) -n H0)))))) y)). -(* COMMENTS -Initial nodes: 103 -END *) +(H0: (lt x n)).(lt_n_S x n H0)))) y)). diff --git a/matita/matita/contribs/lambdadelta/ground_1/ext/tactics.ma b/matita/matita/contribs/lambdadelta/ground_1/ext/tactics.ma index 766db9f1f..e6e1faf02 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/ext/tactics.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/ext/tactics.ma @@ -14,37 +14,28 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/preamble.ma". +include "ground_1/preamble.ma". theorem insert_eq: - \forall (S: Set).(\forall (x: S).(\forall (P: ((S \to Prop))).(\forall (G: -((S \to Prop))).(((\forall (y: S).((P y) \to ((eq S y x) \to (G y))))) \to -((P x) \to (G x)))))) + \forall (S: Type[0]).(\forall (x: S).(\forall (P: ((S \to Prop))).(\forall +(G: ((S \to Prop))).(((\forall (y: S).((P y) \to ((eq S y x) \to (G y))))) +\to ((P x) \to (G x)))))) \def - \lambda (S: Set).(\lambda (x: S).(\lambda (P: ((S \to Prop))).(\lambda (G: -((S \to Prop))).(\lambda (H: ((\forall (y: S).((P y) \to ((eq S y x) \to (G -y)))))).(\lambda (H0: (P x)).(H x H0 (refl_equal S x))))))). -(* COMMENTS -Initial nodes: 45 -END *) + \lambda (S: Type[0]).(\lambda (x: S).(\lambda (P: ((S \to Prop))).(\lambda +(G: ((S \to Prop))).(\lambda (H: ((\forall (y: S).((P y) \to ((eq S y x) \to +(G y)))))).(\lambda (H0: (P x)).(H x H0 (refl_equal S x))))))). theorem unintro: - \forall (A: Set).(\forall (a: A).(\forall (P: ((A \to Prop))).(((\forall (x: -A).(P x))) \to (P a)))) + \forall (A: Type[0]).(\forall (a: A).(\forall (P: ((A \to Prop))).(((\forall +(x: A).(P x))) \to (P a)))) \def - \lambda (A: Set).(\lambda (a: A).(\lambda (P: ((A \to Prop))).(\lambda (H: -((\forall (x: A).(P x)))).(H a)))). -(* COMMENTS -Initial nodes: 17 -END *) + \lambda (A: Type[0]).(\lambda (a: A).(\lambda (P: ((A \to Prop))).(\lambda +(H: ((\forall (x: A).(P x)))).(H a)))). theorem xinduction: - \forall (A: Set).(\forall (t: A).(\forall (P: ((A \to Prop))).(((\forall (x: -A).((eq A t x) \to (P x)))) \to (P t)))) + \forall (A: Type[0]).(\forall (t: A).(\forall (P: ((A \to Prop))).(((\forall +(x: A).((eq A t x) \to (P x)))) \to (P t)))) \def - \lambda (A: Set).(\lambda (t: A).(\lambda (P: ((A \to Prop))).(\lambda (H: -((\forall (x: A).((eq A t x) \to (P x))))).(H t (refl_equal A t))))). -(* COMMENTS -Initial nodes: 31 -END *) + \lambda (A: Type[0]).(\lambda (t: A).(\lambda (P: ((A \to Prop))).(\lambda +(H: ((\forall (x: A).((eq A t x) \to (P x))))).(H t (refl_equal A t))))). diff --git a/matita/matita/contribs/lambdadelta/ground_1/plist/defs.ma b/matita/matita/contribs/lambdadelta/ground_1/plist/defs.ma index 8f9c1d3cc..cfb67e1ff 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/plist/defs.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/plist/defs.ma @@ -14,30 +14,20 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/preamble.ma". +include "ground_1/preamble.ma". -inductive PList: Set \def +inductive PList: Type[0] \def | PNil: PList | PCons: nat \to (nat \to (PList \to PList)). -definition PConsTail: - PList \to (nat \to (nat \to PList)) -\def - let rec PConsTail (hds: PList) on hds: (nat \to (nat \to PList)) \def -(\lambda (h0: nat).(\lambda (d0: nat).(match hds with [PNil \Rightarrow -(PCons h0 d0 PNil) | (PCons h d hds0) \Rightarrow (PCons h d (PConsTail hds0 -h0 d0))]))) in PConsTail. +let rec PConsTail (hds: PList) on hds: nat \to (nat \to PList) \def \lambda +(h0: nat).(\lambda (d0: nat).(match hds with [PNil \Rightarrow (PCons h0 d0 +PNil) | (PCons h d hds0) \Rightarrow (PCons h d (PConsTail hds0 h0 d0))])). -definition Ss: - PList \to PList -\def - let rec Ss (hds: PList) on hds: PList \def (match hds with [PNil \Rightarrow -PNil | (PCons h d hds0) \Rightarrow (PCons h (S d) (Ss hds0))]) in Ss. +let rec Ss (hds: PList) on hds: PList \def match hds with [PNil \Rightarrow +PNil | (PCons h d hds0) \Rightarrow (PCons h (S d) (Ss hds0))]. -definition papp: - PList \to (PList \to PList) -\def - let rec papp (a: PList) on a: (PList \to PList) \def (\lambda (b: -PList).(match a with [PNil \Rightarrow b | (PCons h d a0) \Rightarrow (PCons -h d (papp a0 b))])) in papp. +let rec papp (a: PList) on a: PList \to PList \def \lambda (b: PList).(match +a with [PNil \Rightarrow b | (PCons h d a0) \Rightarrow (PCons h d (papp a0 +b))]). diff --git a/matita/matita/contribs/lambdadelta/ground_1/plist/props.ma b/matita/matita/contribs/lambdadelta/ground_1/plist/props.ma index 990397229..ce17a3c12 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/plist/props.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/plist/props.ma @@ -14,7 +14,7 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/plist/defs.ma". +include "ground_1/plist/defs.ma". theorem papp_ss: \forall (is1: PList).(\forall (is2: PList).(eq PList (papp (Ss is1) (Ss @@ -28,7 +28,4 @@ nat).(\lambda (p: PList).(\lambda (H: ((\forall (is2: PList).(eq PList (papp (Ss (papp p is2)) (\lambda (p0: PList).(eq PList (PCons n (S n0) p0) (PCons n (S n0) (Ss (papp p is2))))) (refl_equal PList (PCons n (S n0) (Ss (papp p is2)))) (papp (Ss p) (Ss is2)) (H is2))))))) is1). -(* COMMENTS -Initial nodes: 151 -END *) diff --git a/matita/matita/contribs/lambdadelta/ground_1/preamble.ma b/matita/matita/contribs/lambdadelta/ground_1/preamble.ma index 16ff2dc44..b19f25444 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/preamble.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/preamble.ma @@ -12,4 +12,4 @@ (* *) (**************************************************************************) -include "Legacy-1/theory.ma". +include "legacy_1/theory.ma". diff --git a/matita/matita/contribs/lambdadelta/ground_1/spare.ma b/matita/matita/contribs/lambdadelta/ground_1/spare.ma index a966c2ae2..e3cba9bbc 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/spare.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/spare.ma @@ -14,5 +14,5 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/theory.ma". +include "ground_1/theory.ma". diff --git a/matita/matita/contribs/lambdadelta/ground_1/theory.ma b/matita/matita/contribs/lambdadelta/ground_1/theory.ma index 3b59dc6e8..e563c691a 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/theory.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/theory.ma @@ -14,13 +14,13 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/ext/tactics.ma". +include "ground_1/ext/tactics.ma". -include "Ground-1/ext/arith.ma". +include "ground_1/types/props.ma". -include "Ground-1/types/props.ma". +include "ground_1/ext/arith.ma". -include "Ground-1/blt/props.ma". +include "ground_1/blt/props.ma". -include "Ground-1/plist/props.ma". +include "ground_1/plist/props.ma". diff --git a/matita/matita/contribs/lambdadelta/ground_1/types/defs.ma b/matita/matita/contribs/lambdadelta/ground_1/types/defs.ma index f94969d88..3a7dadb64 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/types/defs.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/types/defs.ma @@ -14,7 +14,7 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/preamble.ma". +include "ground_1/preamble.ma". inductive and3 (P0: Prop) (P1: Prop) (P2: Prop): Prop \def | and3_intro: P0 \to (P1 \to (P2 \to (and3 P0 P1 P2))). @@ -46,122 +46,124 @@ inductive or5 (P0: Prop) (P1: Prop) (P2: Prop) (P3: Prop) (P4: Prop): Prop | or5_intro3: P3 \to (or5 P0 P1 P2 P3 P4) | or5_intro4: P4 \to (or5 P0 P1 P2 P3 P4). -inductive ex3 (A0: Set) (P0: A0 \to Prop) (P1: A0 \to Prop) (P2: A0 \to +inductive ex3 (A0: Type[0]) (P0: A0 \to Prop) (P1: A0 \to Prop) (P2: A0 \to Prop): Prop \def | ex3_intro: \forall (x0: A0).((P0 x0) \to ((P1 x0) \to ((P2 x0) \to (ex3 A0 P0 P1 P2)))). -inductive ex4 (A0: Set) (P0: A0 \to Prop) (P1: A0 \to Prop) (P2: A0 \to Prop) -(P3: A0 \to Prop): Prop \def +inductive ex4 (A0: Type[0]) (P0: A0 \to Prop) (P1: A0 \to Prop) (P2: A0 \to +Prop) (P3: A0 \to Prop): Prop \def | ex4_intro: \forall (x0: A0).((P0 x0) \to ((P1 x0) \to ((P2 x0) \to ((P3 x0) \to (ex4 A0 P0 P1 P2 P3))))). -inductive ex_2 (A0: Set) (A1: Set) (P0: A0 \to (A1 \to Prop)): Prop \def +inductive ex_2 (A0: Type[0]) (A1: Type[0]) (P0: A0 \to (A1 \to Prop)): Prop +\def | ex_2_intro: \forall (x0: A0).(\forall (x1: A1).((P0 x0 x1) \to (ex_2 A0 A1 P0))). -inductive ex2_2 (A0: Set) (A1: Set) (P0: A0 \to (A1 \to Prop)) (P1: A0 \to -(A1 \to Prop)): Prop \def +inductive ex2_2 (A0: Type[0]) (A1: Type[0]) (P0: A0 \to (A1 \to Prop)) (P1: +A0 \to (A1 \to Prop)): Prop \def | ex2_2_intro: \forall (x0: A0).(\forall (x1: A1).((P0 x0 x1) \to ((P1 x0 x1) \to (ex2_2 A0 A1 P0 P1)))). -inductive ex3_2 (A0: Set) (A1: Set) (P0: A0 \to (A1 \to Prop)) (P1: A0 \to -(A1 \to Prop)) (P2: A0 \to (A1 \to Prop)): Prop \def +inductive ex3_2 (A0: Type[0]) (A1: Type[0]) (P0: A0 \to (A1 \to Prop)) (P1: +A0 \to (A1 \to Prop)) (P2: A0 \to (A1 \to Prop)): Prop \def | ex3_2_intro: \forall (x0: A0).(\forall (x1: A1).((P0 x0 x1) \to ((P1 x0 x1) \to ((P2 x0 x1) \to (ex3_2 A0 A1 P0 P1 P2))))). -inductive ex4_2 (A0: Set) (A1: Set) (P0: A0 \to (A1 \to Prop)) (P1: A0 \to -(A1 \to Prop)) (P2: A0 \to (A1 \to Prop)) (P3: A0 \to (A1 \to Prop)): Prop -\def +inductive ex4_2 (A0: Type[0]) (A1: Type[0]) (P0: A0 \to (A1 \to Prop)) (P1: +A0 \to (A1 \to Prop)) (P2: A0 \to (A1 \to Prop)) (P3: A0 \to (A1 \to Prop)): +Prop \def | ex4_2_intro: \forall (x0: A0).(\forall (x1: A1).((P0 x0 x1) \to ((P1 x0 x1) \to ((P2 x0 x1) \to ((P3 x0 x1) \to (ex4_2 A0 A1 P0 P1 P2 P3)))))). -inductive ex_3 (A0: Set) (A1: Set) (A2: Set) (P0: A0 \to (A1 \to (A2 \to -Prop))): Prop \def +inductive ex_3 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (P0: A0 \to (A1 \to +(A2 \to Prop))): Prop \def | ex_3_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).((P0 x0 x1 x2) \to (ex_3 A0 A1 A2 P0)))). -inductive ex2_3 (A0: Set) (A1: Set) (A2: Set) (P0: A0 \to (A1 \to (A2 \to -Prop))) (P1: A0 \to (A1 \to (A2 \to Prop))): Prop \def +inductive ex2_3 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (P0: A0 \to (A1 \to +(A2 \to Prop))) (P1: A0 \to (A1 \to (A2 \to Prop))): Prop \def | ex2_3_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).((P0 x0 x1 x2) \to ((P1 x0 x1 x2) \to (ex2_3 A0 A1 A2 P0 P1))))). -inductive ex3_3 (A0: Set) (A1: Set) (A2: Set) (P0: A0 \to (A1 \to (A2 \to -Prop))) (P1: A0 \to (A1 \to (A2 \to Prop))) (P2: A0 \to (A1 \to (A2 \to -Prop))): Prop \def +inductive ex3_3 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (P0: A0 \to (A1 \to +(A2 \to Prop))) (P1: A0 \to (A1 \to (A2 \to Prop))) (P2: A0 \to (A1 \to (A2 +\to Prop))): Prop \def | ex3_3_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).((P0 x0 x1 x2) \to ((P1 x0 x1 x2) \to ((P2 x0 x1 x2) \to (ex3_3 A0 A1 A2 P0 P1 P2)))))). -inductive ex4_3 (A0: Set) (A1: Set) (A2: Set) (P0: A0 \to (A1 \to (A2 \to -Prop))) (P1: A0 \to (A1 \to (A2 \to Prop))) (P2: A0 \to (A1 \to (A2 \to -Prop))) (P3: A0 \to (A1 \to (A2 \to Prop))): Prop \def +inductive ex4_3 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (P0: A0 \to (A1 \to +(A2 \to Prop))) (P1: A0 \to (A1 \to (A2 \to Prop))) (P2: A0 \to (A1 \to (A2 +\to Prop))) (P3: A0 \to (A1 \to (A2 \to Prop))): Prop \def | ex4_3_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).((P0 x0 x1 x2) \to ((P1 x0 x1 x2) \to ((P2 x0 x1 x2) \to ((P3 x0 x1 x2) \to (ex4_3 A0 A1 A2 P0 P1 P2 P3))))))). -inductive ex5_3 (A0: Set) (A1: Set) (A2: Set) (P0: A0 \to (A1 \to (A2 \to -Prop))) (P1: A0 \to (A1 \to (A2 \to Prop))) (P2: A0 \to (A1 \to (A2 \to -Prop))) (P3: A0 \to (A1 \to (A2 \to Prop))) (P4: A0 \to (A1 \to (A2 \to +inductive ex5_3 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (P0: A0 \to (A1 \to +(A2 \to Prop))) (P1: A0 \to (A1 \to (A2 \to Prop))) (P2: A0 \to (A1 \to (A2 +\to Prop))) (P3: A0 \to (A1 \to (A2 \to Prop))) (P4: A0 \to (A1 \to (A2 \to Prop))): Prop \def | ex5_3_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).((P0 x0 x1 x2) \to ((P1 x0 x1 x2) \to ((P2 x0 x1 x2) \to ((P3 x0 x1 x2) \to ((P4 x0 x1 x2) \to (ex5_3 A0 A1 A2 P0 P1 P2 P3 P4)))))))). -inductive ex3_4 (A0: Set) (A1: Set) (A2: Set) (A3: Set) (P0: A0 \to (A1 \to -(A2 \to (A3 \to Prop)))) (P1: A0 \to (A1 \to (A2 \to (A3 \to Prop)))) (P2: A0 -\to (A1 \to (A2 \to (A3 \to Prop)))): Prop \def +inductive ex3_4 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (A3: Type[0]) (P0: +A0 \to (A1 \to (A2 \to (A3 \to Prop)))) (P1: A0 \to (A1 \to (A2 \to (A3 \to +Prop)))) (P2: A0 \to (A1 \to (A2 \to (A3 \to Prop)))): Prop \def | ex3_4_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).(\forall (x3: A3).((P0 x0 x1 x2 x3) \to ((P1 x0 x1 x2 x3) \to ((P2 x0 x1 x2 x3) \to (ex3_4 A0 A1 A2 A3 P0 P1 P2))))))). -inductive ex4_4 (A0: Set) (A1: Set) (A2: Set) (A3: Set) (P0: A0 \to (A1 \to -(A2 \to (A3 \to Prop)))) (P1: A0 \to (A1 \to (A2 \to (A3 \to Prop)))) (P2: A0 -\to (A1 \to (A2 \to (A3 \to Prop)))) (P3: A0 \to (A1 \to (A2 \to (A3 \to -Prop)))): Prop \def +inductive ex4_4 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (A3: Type[0]) (P0: +A0 \to (A1 \to (A2 \to (A3 \to Prop)))) (P1: A0 \to (A1 \to (A2 \to (A3 \to +Prop)))) (P2: A0 \to (A1 \to (A2 \to (A3 \to Prop)))) (P3: A0 \to (A1 \to (A2 +\to (A3 \to Prop)))): Prop \def | ex4_4_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).(\forall (x3: A3).((P0 x0 x1 x2 x3) \to ((P1 x0 x1 x2 x3) \to ((P2 x0 x1 x2 x3) \to ((P3 x0 x1 x2 x3) \to (ex4_4 A0 A1 A2 A3 P0 P1 P2 P3)))))))). -inductive ex4_5 (A0: Set) (A1: Set) (A2: Set) (A3: Set) (A4: Set) (P0: A0 \to -(A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P1: A0 \to (A1 \to (A2 \to (A3 \to -(A4 \to Prop))))) (P2: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P3: -A0 \to (A1 \to (A2 \to (A3 \to (A4 \to Prop))))): Prop \def +inductive ex4_5 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (A3: Type[0]) (A4: +Type[0]) (P0: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P1: A0 \to +(A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P2: A0 \to (A1 \to (A2 \to (A3 \to +(A4 \to Prop))))) (P3: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to Prop))))): Prop +\def | ex4_5_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).(\forall (x3: A3).(\forall (x4: A4).((P0 x0 x1 x2 x3 x4) \to ((P1 x0 x1 x2 x3 x4) \to ((P2 x0 x1 x2 x3 x4) \to ((P3 x0 x1 x2 x3 x4) \to (ex4_5 A0 A1 A2 A3 A4 P0 P1 P2 P3))))))))). -inductive ex5_5 (A0: Set) (A1: Set) (A2: Set) (A3: Set) (A4: Set) (P0: A0 \to -(A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P1: A0 \to (A1 \to (A2 \to (A3 \to -(A4 \to Prop))))) (P2: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P3: -A0 \to (A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P4: A0 \to (A1 \to (A2 \to -(A3 \to (A4 \to Prop))))): Prop \def +inductive ex5_5 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (A3: Type[0]) (A4: +Type[0]) (P0: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P1: A0 \to +(A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P2: A0 \to (A1 \to (A2 \to (A3 \to +(A4 \to Prop))))) (P3: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to Prop))))) (P4: +A0 \to (A1 \to (A2 \to (A3 \to (A4 \to Prop))))): Prop \def | ex5_5_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).(\forall (x3: A3).(\forall (x4: A4).((P0 x0 x1 x2 x3 x4) \to ((P1 x0 x1 x2 x3 x4) \to ((P2 x0 x1 x2 x3 x4) \to ((P3 x0 x1 x2 x3 x4) \to ((P4 x0 x1 x2 x3 x4) \to (ex5_5 A0 A1 A2 A3 A4 P0 P1 P2 P3 P4)))))))))). -inductive ex6_6 (A0: Set) (A1: Set) (A2: Set) (A3: Set) (A4: Set) (A5: Set) -(P0: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to Prop)))))) (P1: A0 \to -(A1 \to (A2 \to (A3 \to (A4 \to (A5 \to Prop)))))) (P2: A0 \to (A1 \to (A2 -\to (A3 \to (A4 \to (A5 \to Prop)))))) (P3: A0 \to (A1 \to (A2 \to (A3 \to -(A4 \to (A5 \to Prop)))))) (P4: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 -\to Prop)))))) (P5: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to -Prop)))))): Prop \def +inductive ex6_6 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (A3: Type[0]) (A4: +Type[0]) (A5: Type[0]) (P0: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to +Prop)))))) (P1: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to Prop)))))) +(P2: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to Prop)))))) (P3: A0 \to +(A1 \to (A2 \to (A3 \to (A4 \to (A5 \to Prop)))))) (P4: A0 \to (A1 \to (A2 +\to (A3 \to (A4 \to (A5 \to Prop)))))) (P5: A0 \to (A1 \to (A2 \to (A3 \to +(A4 \to (A5 \to Prop)))))): Prop \def | ex6_6_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).(\forall (x3: A3).(\forall (x4: A4).(\forall (x5: A5).((P0 x0 x1 x2 x3 x4 x5) \to ((P1 x0 x1 x2 x3 x4 x5) \to ((P2 x0 x1 x2 x3 x4 x5) \to ((P3 x0 x1 x2 x3 x4 x5) \to ((P4 x0 x1 x2 x3 x4 x5) \to ((P5 x0 x1 x2 x3 x4 x5) \to (ex6_6 A0 A1 A2 A3 A4 A5 P0 P1 P2 P3 P4 P5)))))))))))). -inductive ex6_7 (A0: Set) (A1: Set) (A2: Set) (A3: Set) (A4: Set) (A5: Set) -(A6: Set) (P0: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to (A6 \to -Prop))))))) (P1: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to (A6 \to -Prop))))))) (P2: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to (A6 \to -Prop))))))) (P3: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to (A6 \to -Prop))))))) (P4: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to (A6 \to -Prop))))))) (P5: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to (A6 \to +inductive ex6_7 (A0: Type[0]) (A1: Type[0]) (A2: Type[0]) (A3: Type[0]) (A4: +Type[0]) (A5: Type[0]) (A6: Type[0]) (P0: A0 \to (A1 \to (A2 \to (A3 \to (A4 +\to (A5 \to (A6 \to Prop))))))) (P1: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to +(A5 \to (A6 \to Prop))))))) (P2: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 +\to (A6 \to Prop))))))) (P3: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to +(A6 \to Prop))))))) (P4: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to (A6 +\to Prop))))))) (P5: A0 \to (A1 \to (A2 \to (A3 \to (A4 \to (A5 \to (A6 \to Prop))))))): Prop \def | ex6_7_intro: \forall (x0: A0).(\forall (x1: A1).(\forall (x2: A2).(\forall (x3: A3).(\forall (x4: A4).(\forall (x5: A5).(\forall (x6: A6).((P0 x0 x1 x2 diff --git a/matita/matita/contribs/lambdadelta/ground_1/types/props.ma b/matita/matita/contribs/lambdadelta/ground_1/types/props.ma index 9c326f44c..7eabcfdb5 100644 --- a/matita/matita/contribs/lambdadelta/ground_1/types/props.ma +++ b/matita/matita/contribs/lambdadelta/ground_1/types/props.ma @@ -14,20 +14,17 @@ (* This file was automatically generated: do not edit *********************) -include "Ground-1/types/defs.ma". +include "ground_1/types/defs.ma". theorem ex2_sym: - \forall (A: Set).(\forall (P: ((A \to Prop))).(\forall (Q: ((A \to + \forall (A: Type[0]).(\forall (P: ((A \to Prop))).(\forall (Q: ((A \to Prop))).((ex2 A (\lambda (x: A).(P x)) (\lambda (x: A).(Q x))) \to (ex2 A (\lambda (x: A).(Q x)) (\lambda (x: A).(P x)))))) \def - \lambda (A: Set).(\lambda (P: ((A \to Prop))).(\lambda (Q: ((A \to + \lambda (A: Type[0]).(\lambda (P: ((A \to Prop))).(\lambda (Q: ((A \to Prop))).(\lambda (H: (ex2 A (\lambda (x: A).(P x)) (\lambda (x: A).(Q x)))).(ex2_ind A (\lambda (x: A).(P x)) (\lambda (x: A).(Q x)) (ex2 A (\lambda (x: A).(Q x)) (\lambda (x: A).(P x))) (\lambda (x: A).(\lambda (H0: (P x)).(\lambda (H1: (Q x)).(ex_intro2 A (\lambda (x0: A).(Q x0)) (\lambda (x0: A).(P x0)) x H1 H0)))) H)))). -(* COMMENTS -Initial nodes: 91 -END *) diff --git a/matita/matita/contribs/lambdadelta/legacy_1/coq/defs.ma b/matita/matita/contribs/lambdadelta/legacy_1/coq/defs.ma index 7d4696229..75e58b036 100644 --- a/matita/matita/contribs/lambdadelta/legacy_1/coq/defs.ma +++ b/matita/matita/contribs/lambdadelta/legacy_1/coq/defs.ma @@ -14,9 +14,9 @@ (* This file was automatically generated: do not edit *********************) -include "Legacy-1/preamble.ma". +include "legacy_1/preamble.ma". -inductive eq (A: Set) (x: A): A \to Prop \def +inductive eq (A: Type[0]) (x: A): A \to Prop \def | refl_equal: eq A x x. inductive True: Prop \def @@ -29,10 +29,10 @@ inductive or (A: Prop) (B: Prop): Prop \def | or_introl: A \to (or A B) | or_intror: B \to (or A B). -inductive ex (A: Set) (P: A \to Prop): Prop \def +inductive ex (A: Type[0]) (P: A \to Prop): Prop \def | ex_intro: \forall (x: A).((P x) \to (ex A P)). -inductive ex2 (A: Set) (P: A \to Prop) (Q: A \to Prop): Prop \def +inductive ex2 (A: Type[0]) (P: A \to Prop) (Q: A \to Prop): Prop \def | ex_intro2: \forall (x: A).((P x) \to ((Q x) \to (ex2 A P Q))). definition not: @@ -40,11 +40,11 @@ definition not: \def \lambda (A: Prop).(A \to False). -inductive bool: Set \def +inductive bool: Type[0] \def | true: bool | false: bool. -inductive nat: Set \def +inductive nat: Type[0] \def | O: nat | S: nat \to nat. @@ -68,32 +68,26 @@ definition pred: \def \lambda (n: nat).(match n with [O \Rightarrow O | (S u) \Rightarrow u]). -definition plus: - nat \to (nat \to nat) -\def - let rec plus (n: nat) on n: (nat \to nat) \def (\lambda (m: nat).(match n -with [O \Rightarrow m | (S p) \Rightarrow (S (plus p m))])) in plus. +let rec plus (n: nat) on n: nat \to nat \def \lambda (m: nat).(match n with +[O \Rightarrow m | (S p) \Rightarrow (S (plus p m))]). -definition minus: - nat \to (nat \to nat) -\def - let rec minus (n: nat) on n: (nat \to nat) \def (\lambda (m: nat).(match n -with [O \Rightarrow O | (S k) \Rightarrow (match m with [O \Rightarrow (S k) -| (S l) \Rightarrow (minus k l)])])) in minus. +let rec minus (n: nat) on n: nat \to nat \def \lambda (m: nat).(match n with +[O \Rightarrow O | (S k) \Rightarrow (match m with [O \Rightarrow (S k) | (S +l) \Rightarrow (minus k l)])]). -inductive Acc (A: Set) (R: A \to (A \to Prop)): A \to Prop \def +inductive Acc (A: Type[0]) (R: A \to (A \to Prop)): A \to Prop \def | Acc_intro: \forall (x: A).(((\forall (y: A).((R y x) \to (Acc A R y)))) \to (Acc A R x)). definition well_founded: - \forall (A: Set).(((A \to (A \to Prop))) \to Prop) + \forall (A: Type[0]).(((A \to (A \to Prop))) \to Prop) \def - \lambda (A: Set).(\lambda (R: ((A \to (A \to Prop)))).(\forall (a: A).(Acc A -R a))). + \lambda (A: Type[0]).(\lambda (R: ((A \to (A \to Prop)))).(\forall (a: +A).(Acc A R a))). definition ltof: - \forall (A: Set).(((A \to nat)) \to (A \to (A \to Prop))) + \forall (A: Type[0]).(((A \to nat)) \to (A \to (A \to Prop))) \def - \lambda (A: Set).(\lambda (f: ((A \to nat))).(\lambda (a: A).(\lambda (b: -A).(lt (f a) (f b))))). + \lambda (A: Type[0]).(\lambda (f: ((A \to nat))).(\lambda (a: A).(\lambda +(b: A).(lt (f a) (f b))))). diff --git a/matita/matita/contribs/lambdadelta/legacy_1/coq/elim.ma b/matita/matita/contribs/lambdadelta/legacy_1/coq/elim.ma new file mode 100644 index 000000000..75103b99a --- /dev/null +++ b/matita/matita/contribs/lambdadelta/legacy_1/coq/elim.ma @@ -0,0 +1,94 @@ +(**************************************************************************) +(* ___ *) +(* ||M|| *) +(* ||A|| A project by Andrea Asperti *) +(* ||T|| *) +(* ||I|| Developers: *) +(* ||T|| The HELM team. *) +(* ||A|| http://helm.cs.unibo.it *) +(* \ / *) +(* \ / This file is distributed under the terms of the *) +(* v GNU General Public License Version 2 *) +(* *) +(**************************************************************************) + +(* This file was automatically generated: do not edit *********************) + +include "legacy_1/coq/defs.ma". + +theorem False_rect: + \forall (P: Type[0]).(False \to P) +\def + \lambda (P: Type[0]).(\lambda (f: False).(match f in False with [])). + +theorem False_ind: + \forall (P: Prop).(False \to P) +\def + \lambda (P: Prop).(False_rect P). + +theorem land_rect: + \forall (A: Prop).(\forall (B: Prop).(\forall (P: Type[0]).(((A \to (B \to +P))) \to ((land A B) \to P)))) +\def + \lambda (A: Prop).(\lambda (B: Prop).(\lambda (P: Type[0]).(\lambda (f: ((A +\to (B \to P)))).(\lambda (a: (land A B)).(match a in land with [(conj x x0) +\Rightarrow (f x x0)]))))). + +theorem land_ind: + \forall (A: Prop).(\forall (B: Prop).(\forall (P: Prop).(((A \to (B \to P))) +\to ((land A B) \to P)))) +\def + \lambda (A: Prop).(\lambda (B: Prop).(\lambda (P: Prop).(land_rect A B P))). + +theorem or_ind: + \forall (A: Prop).(\forall (B: Prop).(\forall (P: Prop).(((A \to P)) \to +(((B \to P)) \to ((or A B) \to P))))) +\def + \lambda (A: Prop).(\lambda (B: Prop).(\lambda (P: Prop).(\lambda (f: ((A \to +P))).(\lambda (f0: ((B \to P))).(\lambda (o: (or A B)).(match o in or with +[(or_introl x) \Rightarrow (f x) | (or_intror x) \Rightarrow (f0 x)])))))). + +theorem ex_ind: + \forall (A: Type[0]).(\forall (P: ((A \to Prop))).(\forall (P0: +Prop).(((\forall (x: A).((P x) \to P0))) \to ((ex A P) \to P0)))) +\def + \lambda (A: Type[0]).(\lambda (P: ((A \to Prop))).(\lambda (P0: +Prop).(\lambda (f: ((\forall (x: A).((P x) \to P0)))).(\lambda (e: (ex A +P)).(match e in ex with [(ex_intro x x0) \Rightarrow (f x x0)]))))). + +theorem ex2_ind: + \forall (A: Type[0]).(\forall (P: ((A \to Prop))).(\forall (Q: ((A \to +Prop))).(\forall (P0: Prop).(((\forall (x: A).((P x) \to ((Q x) \to P0)))) +\to ((ex2 A P Q) \to P0))))) +\def + \lambda (A: Type[0]).(\lambda (P: ((A \to Prop))).(\lambda (Q: ((A \to +Prop))).(\lambda (P0: Prop).(\lambda (f: ((\forall (x: A).((P x) \to ((Q x) +\to P0))))).(\lambda (e: (ex2 A P Q)).(match e in ex2 with [(ex_intro2 x x0 +x1) \Rightarrow (f x x0 x1)])))))). + +theorem eq_rect: + \forall (A: Type[0]).(\forall (x: A).(\forall (P: ((A \to Type[0]))).((P x) +\to (\forall (y: A).((eq A x y) \to (P y)))))) +\def + \lambda (A: Type[0]).(\lambda (x: A).(\lambda (P: ((A \to +Type[0]))).(\lambda (f: (P x)).(\lambda (y: A).(\lambda (e: (eq A x +y)).(match e in eq with [refl_equal \Rightarrow f])))))). + +theorem eq_ind: + \forall (A: Type[0]).(\forall (x: A).(\forall (P: ((A \to Prop))).((P x) \to +(\forall (y: A).((eq A x y) \to (P y)))))) +\def + \lambda (A: Type[0]).(\lambda (x: A).(\lambda (P: ((A \to Prop))).(eq_rect A +x P))). + +let rec le_ind (n: nat) (P: (nat \to Prop)) (f: P n) (f0: (\forall (m: +nat).((le n m) \to ((P m) \to (P (S m)))))) (n0: nat) (l: le n n0) on l: P n0 +\def match l in le with [le_n \Rightarrow f | (le_S m l0) \Rightarrow (f0 m +l0 ((le_ind n P f f0) m l0))]. + +let rec Acc_ind (A: Type[0]) (R: (A \to (A \to Prop))) (P: (A \to Prop)) (f: +(\forall (x: A).(((\forall (y: A).((R y x) \to (Acc A R y)))) \to (((\forall +(y: A).((R y x) \to (P y)))) \to (P x))))) (a: A) (a0: Acc A R a) on a0: P a +\def match a0 in Acc with [(Acc_intro x a1) \Rightarrow (f x a1 (\lambda (y: +A).(\lambda (r: (R y x)).((Acc_ind A R P f) y (a1 y r)))))]. + diff --git a/matita/matita/contribs/lambdadelta/legacy_1/coq/props.ma b/matita/matita/contribs/lambdadelta/legacy_1/coq/props.ma index 0b9d97b42..f997eb49d 100644 --- a/matita/matita/contribs/lambdadelta/legacy_1/coq/props.ma +++ b/matita/matita/contribs/lambdadelta/legacy_1/coq/props.ma @@ -14,98 +14,76 @@ (* This file was automatically generated: do not edit *********************) -include "Legacy-1/coq/defs.ma". +include "legacy_1/coq/elim.ma". theorem f_equal: - \forall (A: Set).(\forall (B: Set).(\forall (f: ((A \to B))).(\forall (x: -A).(\forall (y: A).((eq A x y) \to (eq B (f x) (f y))))))) + \forall (A: Type[0]).(\forall (B: Type[0]).(\forall (f: ((A \to +B))).(\forall (x: A).(\forall (y: A).((eq A x y) \to (eq B (f x) (f y))))))) \def - \lambda (A: Set).(\lambda (B: Set).(\lambda (f: ((A \to B))).(\lambda (x: -A).(\lambda (y: A).(\lambda (H: (eq A x y)).(eq_ind A x (\lambda (a: A).(eq B -(f x) (f a))) (refl_equal B (f x)) y H)))))). -(* COMMENTS -Initial nodes: 51 -END *) + \lambda (A: Type[0]).(\lambda (B: Type[0]).(\lambda (f: ((A \to +B))).(\lambda (x: A).(\lambda (y: A).(\lambda (H: (eq A x y)).(eq_ind A x +(\lambda (a: A).(eq B (f x) (f a))) (refl_equal B (f x)) y H)))))). theorem f_equal2: - \forall (A1: Set).(\forall (A2: Set).(\forall (B: Set).(\forall (f: ((A1 \to -(A2 \to B)))).(\forall (x1: A1).(\forall (y1: A1).(\forall (x2: A2).(\forall -(y2: A2).((eq A1 x1 y1) \to ((eq A2 x2 y2) \to (eq B (f x1 x2) (f y1 -y2))))))))))) -\def - \lambda (A1: Set).(\lambda (A2: Set).(\lambda (B: Set).(\lambda (f: ((A1 \to -(A2 \to B)))).(\lambda (x1: A1).(\lambda (y1: A1).(\lambda (x2: A2).(\lambda -(y2: A2).(\lambda (H: (eq A1 x1 y1)).(eq_ind A1 x1 (\lambda (a: A1).((eq A2 -x2 y2) \to (eq B (f x1 x2) (f a y2)))) (\lambda (H0: (eq A2 x2 y2)).(eq_ind -A2 x2 (\lambda (a: A2).(eq B (f x1 x2) (f x1 a))) (refl_equal B (f x1 x2)) y2 -H0)) y1 H))))))))). -(* COMMENTS -Initial nodes: 109 -END *) + \forall (A1: Type[0]).(\forall (A2: Type[0]).(\forall (B: Type[0]).(\forall +(f: ((A1 \to (A2 \to B)))).(\forall (x1: A1).(\forall (y1: A1).(\forall (x2: +A2).(\forall (y2: A2).((eq A1 x1 y1) \to ((eq A2 x2 y2) \to (eq B (f x1 x2) +(f y1 y2))))))))))) +\def + \lambda (A1: Type[0]).(\lambda (A2: Type[0]).(\lambda (B: Type[0]).(\lambda +(f: ((A1 \to (A2 \to B)))).(\lambda (x1: A1).(\lambda (y1: A1).(\lambda (x2: +A2).(\lambda (y2: A2).(\lambda (H: (eq A1 x1 y1)).(eq_ind A1 x1 (\lambda (a: +A1).((eq A2 x2 y2) \to (eq B (f x1 x2) (f a y2)))) (\lambda (H0: (eq A2 x2 +y2)).(eq_ind A2 x2 (\lambda (a: A2).(eq B (f x1 x2) (f x1 a))) (refl_equal B +(f x1 x2)) y2 H0)) y1 H))))))))). theorem f_equal3: - \forall (A1: Set).(\forall (A2: Set).(\forall (A3: Set).(\forall (B: -Set).(\forall (f: ((A1 \to (A2 \to (A3 \to B))))).(\forall (x1: A1).(\forall -(y1: A1).(\forall (x2: A2).(\forall (y2: A2).(\forall (x3: A3).(\forall (y3: -A3).((eq A1 x1 y1) \to ((eq A2 x2 y2) \to ((eq A3 x3 y3) \to (eq B (f x1 x2 -x3) (f y1 y2 y3))))))))))))))) -\def - \lambda (A1: Set).(\lambda (A2: Set).(\lambda (A3: Set).(\lambda (B: -Set).(\lambda (f: ((A1 \to (A2 \to (A3 \to B))))).(\lambda (x1: A1).(\lambda -(y1: A1).(\lambda (x2: A2).(\lambda (y2: A2).(\lambda (x3: A3).(\lambda (y3: -A3).(\lambda (H: (eq A1 x1 y1)).(eq_ind A1 x1 (\lambda (a: A1).((eq A2 x2 y2) -\to ((eq A3 x3 y3) \to (eq B (f x1 x2 x3) (f a y2 y3))))) (\lambda (H0: (eq -A2 x2 y2)).(eq_ind A2 x2 (\lambda (a: A2).((eq A3 x3 y3) \to (eq B (f x1 x2 -x3) (f x1 a y3)))) (\lambda (H1: (eq A3 x3 y3)).(eq_ind A3 x3 (\lambda (a: -A3).(eq B (f x1 x2 x3) (f x1 x2 a))) (refl_equal B (f x1 x2 x3)) y3 H1)) y2 -H0)) y1 H)))))))))))). -(* COMMENTS -Initial nodes: 183 -END *) + \forall (A1: Type[0]).(\forall (A2: Type[0]).(\forall (A3: Type[0]).(\forall +(B: Type[0]).(\forall (f: ((A1 \to (A2 \to (A3 \to B))))).(\forall (x1: +A1).(\forall (y1: A1).(\forall (x2: A2).(\forall (y2: A2).(\forall (x3: +A3).(\forall (y3: A3).((eq A1 x1 y1) \to ((eq A2 x2 y2) \to ((eq A3 x3 y3) +\to (eq B (f x1 x2 x3) (f y1 y2 y3))))))))))))))) +\def + \lambda (A1: Type[0]).(\lambda (A2: Type[0]).(\lambda (A3: Type[0]).(\lambda +(B: Type[0]).(\lambda (f: ((A1 \to (A2 \to (A3 \to B))))).(\lambda (x1: +A1).(\lambda (y1: A1).(\lambda (x2: A2).(\lambda (y2: A2).(\lambda (x3: +A3).(\lambda (y3: A3).(\lambda (H: (eq A1 x1 y1)).(eq_ind A1 x1 (\lambda (a: +A1).((eq A2 x2 y2) \to ((eq A3 x3 y3) \to (eq B (f x1 x2 x3) (f a y2 y3))))) +(\lambda (H0: (eq A2 x2 y2)).(eq_ind A2 x2 (\lambda (a: A2).((eq A3 x3 y3) +\to (eq B (f x1 x2 x3) (f x1 a y3)))) (\lambda (H1: (eq A3 x3 y3)).(eq_ind A3 +x3 (\lambda (a: A3).(eq B (f x1 x2 x3) (f x1 x2 a))) (refl_equal B (f x1 x2 +x3)) y3 H1)) y2 H0)) y1 H)))))))))))). theorem sym_eq: - \forall (A: Set).(\forall (x: A).(\forall (y: A).((eq A x y) \to (eq A y + \forall (A: Type[0]).(\forall (x: A).(\forall (y: A).((eq A x y) \to (eq A y x)))) \def - \lambda (A: Set).(\lambda (x: A).(\lambda (y: A).(\lambda (H: (eq A x + \lambda (A: Type[0]).(\lambda (x: A).(\lambda (y: A).(\lambda (H: (eq A x y)).(eq_ind A x (\lambda (a: A).(eq A a x)) (refl_equal A x) y H)))). -(* COMMENTS -Initial nodes: 39 -END *) theorem eq_ind_r: - \forall (A: Set).(\forall (x: A).(\forall (P: ((A \to Prop))).((P x) \to + \forall (A: Type[0]).(\forall (x: A).(\forall (P: ((A \to Prop))).((P x) \to (\forall (y: A).((eq A y x) \to (P y)))))) \def - \lambda (A: Set).(\lambda (x: A).(\lambda (P: ((A \to Prop))).(\lambda (H: -(P x)).(\lambda (y: A).(\lambda (H0: (eq A y x)).(match (sym_eq A y x H0) in -eq return (\lambda (a: A).(\lambda (_: (eq ? ? a)).(P a))) with [refl_equal -\Rightarrow H])))))). -(* COMMENTS -Initial nodes: 38 -END *) + \lambda (A: Type[0]).(\lambda (x: A).(\lambda (P: ((A \to Prop))).(\lambda +(H: (P x)).(\lambda (y: A).(\lambda (H0: (eq A y x)).(match (sym_eq A y x H0) +in eq with [refl_equal \Rightarrow H])))))). theorem trans_eq: - \forall (A: Set).(\forall (x: A).(\forall (y: A).(\forall (z: A).((eq A x y) -\to ((eq A y z) \to (eq A x z)))))) + \forall (A: Type[0]).(\forall (x: A).(\forall (y: A).(\forall (z: A).((eq A +x y) \to ((eq A y z) \to (eq A x z)))))) \def - \lambda (A: Set).(\lambda (x: A).(\lambda (y: A).(\lambda (z: A).(\lambda -(H: (eq A x y)).(\lambda (H0: (eq A y z)).(eq_ind A y (\lambda (a: A).(eq A x -a)) H z H0)))))). -(* COMMENTS -Initial nodes: 45 -END *) + \lambda (A: Type[0]).(\lambda (x: A).(\lambda (y: A).(\lambda (z: +A).(\lambda (H: (eq A x y)).(\lambda (H0: (eq A y z)).(eq_ind A y (\lambda +(a: A).(eq A x a)) H z H0)))))). theorem sym_not_eq: - \forall (A: Set).(\forall (x: A).(\forall (y: A).((not (eq A x y)) \to (not -(eq A y x))))) + \forall (A: Type[0]).(\forall (x: A).(\forall (y: A).((not (eq A x y)) \to +(not (eq A y x))))) \def - \lambda (A: Set).(\lambda (x: A).(\lambda (y: A).(\lambda (h1: (not (eq A x -y))).(\lambda (h2: (eq A y x)).(h1 (eq_ind A y (\lambda (a: A).(eq A a y)) -(refl_equal A y) x h2)))))). -(* COMMENTS -Initial nodes: 51 -END *) + \lambda (A: Type[0]).(\lambda (x: A).(\lambda (y: A).(\lambda (h1: (not (eq +A x y))).(\lambda (h2: (eq A y x)).(h1 (eq_ind A y (\lambda (a: A).(eq A a +y)) (refl_equal A y) x h2)))))). theorem nat_double_ind: \forall (R: ((nat \to (nat \to Prop)))).(((\forall (n: nat).(R O n))) \to @@ -120,27 +98,18 @@ nat).(nat_ind (\lambda (n0: nat).(\forall (m: nat).(R n0 m))) H (\lambda (n0: nat).(\lambda (H2: ((\forall (m: nat).(R n0 m)))).(\lambda (m: nat).(nat_ind (\lambda (n1: nat).(R (S n0) n1)) (H0 n0) (\lambda (n1: nat).(\lambda (_: (R (S n0) n1)).(H1 n0 n1 (H2 n1)))) m)))) n))))). -(* COMMENTS -Initial nodes: 111 -END *) theorem eq_add_S: \forall (n: nat).(\forall (m: nat).((eq nat (S n) (S m)) \to (eq nat n m))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (eq nat (S n) (S m))).(f_equal nat nat pred (S n) (S m) H))). -(* COMMENTS -Initial nodes: 33 -END *) theorem O_S: \forall (n: nat).(not (eq nat O (S n))) \def \lambda (n: nat).(\lambda (H: (eq nat O (S n))).(eq_ind nat (S n) (\lambda (n0: nat).(IsSucc n0)) I O (sym_eq nat O (S n) H))). -(* COMMENTS -Initial nodes: 41 -END *) theorem not_eq_S: \forall (n: nat).(\forall (m: nat).((not (eq nat n m)) \to (not (eq nat (S @@ -148,17 +117,11 @@ n) (S m))))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (not (eq nat n m))).(\lambda (H0: (eq nat (S n) (S m))).(H (eq_add_S n m H0))))). -(* COMMENTS -Initial nodes: 35 -END *) theorem pred_Sn: \forall (m: nat).(eq nat m (pred (S m))) \def \lambda (m: nat).(refl_equal nat (pred (S m))). -(* COMMENTS -Initial nodes: 11 -END *) theorem S_pred: \forall (n: nat).(\forall (m: nat).((lt m n) \to (eq nat n (S (pred n))))) @@ -167,9 +130,6 @@ theorem S_pred: (\lambda (n0: nat).(eq nat n0 (S (pred n0)))) (refl_equal nat (S (pred (S m)))) (\lambda (m0: nat).(\lambda (_: (le (S m) m0)).(\lambda (_: (eq nat m0 (S (pred m0)))).(refl_equal nat (S (pred (S m0))))))) n H))). -(* COMMENTS -Initial nodes: 79 -END *) theorem le_trans: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((le n m) \to ((le m p) @@ -179,18 +139,12 @@ theorem le_trans: m)).(\lambda (H0: (le m p)).(le_ind m (\lambda (n0: nat).(le n n0)) H (\lambda (m0: nat).(\lambda (_: (le m m0)).(\lambda (IHle: (le n m0)).(le_S n m0 IHle)))) p H0))))). -(* COMMENTS -Initial nodes: 57 -END *) theorem le_trans_S: \forall (n: nat).(\forall (m: nat).((le (S n) m) \to (le n m))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le (S n) m)).(le_trans n (S n) m (le_S n n (le_n n)) H))). -(* COMMENTS -Initial nodes: 33 -END *) theorem le_n_S: \forall (n: nat).(\forall (m: nat).((le n m) \to (le (S n) (S m)))) @@ -198,18 +152,12 @@ theorem le_n_S: \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(le_ind n (\lambda (n0: nat).(le (S n) (S n0))) (le_n (S n)) (\lambda (m0: nat).(\lambda (_: (le n m0)).(\lambda (IHle: (le (S n) (S m0))).(le_S (S n) (S m0) IHle)))) m H))). -(* COMMENTS -Initial nodes: 65 -END *) theorem le_O_n: \forall (n: nat).(le O n) \def \lambda (n: nat).(nat_ind (\lambda (n0: nat).(le O n0)) (le_n O) (\lambda (n0: nat).(\lambda (IHn: (le O n0)).(le_S O n0 IHn))) n). -(* COMMENTS -Initial nodes: 33 -END *) theorem le_S_n: \forall (n: nat).(\forall (m: nat).((le (S n) (S m)) \to (le n m))) @@ -218,9 +166,6 @@ theorem le_S_n: n) (\lambda (n0: nat).(le (pred (S n)) (pred n0))) (le_n n) (\lambda (m0: nat).(\lambda (H0: (le (S n) m0)).(\lambda (_: (le n (pred m0))).(le_trans_S n m0 H0)))) (S m) H))). -(* COMMENTS -Initial nodes: 69 -END *) theorem le_Sn_O: \forall (n: nat).(not (le (S n) O)) @@ -228,9 +173,6 @@ theorem le_Sn_O: \lambda (n: nat).(\lambda (H: (le (S n) O)).(le_ind (S n) (\lambda (n0: nat).(IsSucc n0)) I (\lambda (m: nat).(\lambda (_: (le (S n) m)).(\lambda (_: (IsSucc m)).I))) O H)). -(* COMMENTS -Initial nodes: 43 -END *) theorem le_Sn_n: \forall (n: nat).(not (le (S n) n)) @@ -238,9 +180,6 @@ theorem le_Sn_n: \lambda (n: nat).(nat_ind (\lambda (n0: nat).(not (le (S n0) n0))) (le_Sn_O O) (\lambda (n0: nat).(\lambda (IHn: (not (le (S n0) n0))).(\lambda (H: (le (S (S n0)) (S n0))).(IHn (le_S_n (S n0) n0 H))))) n). -(* COMMENTS -Initial nodes: 57 -END *) theorem le_antisym: \forall (n: nat).(\forall (m: nat).((le n m) \to ((le m n) \to (eq nat n @@ -252,17 +191,11 @@ nat n)) (\lambda (m0: nat).(\lambda (H: (le n m0)).(\lambda (_: (((le m0 n) \to (eq nat n m0)))).(\lambda (H1: (le (S m0) n)).(False_ind (eq nat n (S m0)) (let H2 \def (le_trans (S m0) n m0 H1 H) in ((let H3 \def (le_Sn_n m0) in (\lambda (H4: (le (S m0) m0)).(H3 H4))) H2))))))) m h))). -(* COMMENTS -Initial nodes: 119 -END *) theorem le_n_O_eq: \forall (n: nat).((le n O) \to (eq nat O n)) \def \lambda (n: nat).(\lambda (H: (le n O)).(le_antisym O n (le_O_n n) H)). -(* COMMENTS -Initial nodes: 19 -END *) theorem le_elim_rel: \forall (P: ((nat \to (nat \to Prop)))).(((\forall (p: nat).(P O p))) \to @@ -279,51 +212,33 @@ m)).(le_ind (S n0) (\lambda (n1: nat).(P (S n0) n1)) (H0 n0 n0 (le_n n0) (IHn n0 (le_n n0))) (\lambda (m0: nat).(\lambda (H1: (le (S n0) m0)).(\lambda (_: (P (S n0) m0)).(H0 n0 m0 (le_trans_S n0 m0 H1) (IHn m0 (le_trans_S n0 m0 H1)))))) m Le))))) n)))). -(* COMMENTS -Initial nodes: 181 -END *) theorem lt_n_n: \forall (n: nat).(not (lt n n)) \def le_Sn_n. -(* COMMENTS -Initial nodes: 1 -END *) theorem lt_n_S: \forall (n: nat).(\forall (m: nat).((lt n m) \to (lt (S n) (S m)))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (lt n m)).(le_n_S (S n) m H))). -(* COMMENTS -Initial nodes: 19 -END *) theorem lt_n_Sn: \forall (n: nat).(lt n (S n)) \def \lambda (n: nat).(le_n (S n)). -(* COMMENTS -Initial nodes: 7 -END *) theorem lt_S_n: \forall (n: nat).(\forall (m: nat).((lt (S n) (S m)) \to (lt n m))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (lt (S n) (S m))).(le_S_n (S n) m H))). -(* COMMENTS -Initial nodes: 23 -END *) theorem lt_n_O: \forall (n: nat).(not (lt n O)) \def le_Sn_O. -(* COMMENTS -Initial nodes: 1 -END *) theorem lt_trans: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((lt n m) \to ((lt m p) @@ -333,25 +248,16 @@ theorem lt_trans: m)).(\lambda (H0: (lt m p)).(le_ind (S m) (\lambda (n0: nat).(lt n n0)) (le_S (S n) m H) (\lambda (m0: nat).(\lambda (_: (le (S m) m0)).(\lambda (IHle: (lt n m0)).(le_S (S n) m0 IHle)))) p H0))))). -(* COMMENTS -Initial nodes: 71 -END *) theorem lt_O_Sn: \forall (n: nat).(lt O (S n)) \def \lambda (n: nat).(le_n_S O n (le_O_n n)). -(* COMMENTS -Initial nodes: 11 -END *) theorem lt_le_S: \forall (n: nat).(\forall (p: nat).((lt n p) \to (le (S n) p))) \def \lambda (n: nat).(\lambda (p: nat).(\lambda (H: (lt n p)).H)). -(* COMMENTS -Initial nodes: 11 -END *) theorem le_not_lt: \forall (n: nat).(\forall (m: nat).((le n m) \to (not (lt m n)))) @@ -360,17 +266,11 @@ theorem le_not_lt: (n0: nat).(not (lt n0 n))) (lt_n_n n) (\lambda (m0: nat).(\lambda (_: (le n m0)).(\lambda (IHle: (not (lt m0 n))).(\lambda (H1: (lt (S m0) n)).(IHle (le_trans_S (S m0) n H1)))))) m H))). -(* COMMENTS -Initial nodes: 67 -END *) theorem le_lt_n_Sm: \forall (n: nat).(\forall (m: nat).((le n m) \to (lt n (S m)))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(le_n_S n m H))). -(* COMMENTS -Initial nodes: 17 -END *) theorem le_lt_trans: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((le n m) \to ((lt m p) @@ -380,9 +280,6 @@ theorem le_lt_trans: m)).(\lambda (H0: (lt m p)).(le_ind (S m) (\lambda (n0: nat).(lt n n0)) (le_n_S n m H) (\lambda (m0: nat).(\lambda (_: (le (S m) m0)).(\lambda (IHle: (lt n m0)).(le_S (S n) m0 IHle)))) p H0))))). -(* COMMENTS -Initial nodes: 69 -END *) theorem lt_le_trans: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((lt n m) \to ((le m p) @@ -392,27 +289,18 @@ theorem lt_le_trans: m)).(\lambda (H0: (le m p)).(le_ind m (\lambda (n0: nat).(lt n n0)) H (\lambda (m0: nat).(\lambda (_: (le m m0)).(\lambda (IHle: (lt n m0)).(le_S (S n) m0 IHle)))) p H0))))). -(* COMMENTS -Initial nodes: 59 -END *) theorem lt_le_weak: \forall (n: nat).(\forall (m: nat).((lt n m) \to (le n m))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (lt n m)).(le_trans_S n m H))). -(* COMMENTS -Initial nodes: 17 -END *) theorem lt_n_Sm_le: \forall (n: nat).(\forall (m: nat).((lt n (S m)) \to (le n m))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (lt n (S m))).(le_S_n n m H))). -(* COMMENTS -Initial nodes: 19 -END *) theorem le_lt_or_eq: \forall (n: nat).(\forall (m: nat).((le n m) \to (or (lt n m) (eq nat n m)))) @@ -422,9 +310,6 @@ theorem le_lt_or_eq: (refl_equal nat n)) (\lambda (m0: nat).(\lambda (H0: (le n m0)).(\lambda (_: (or (lt n m0) (eq nat n m0))).(or_introl (lt n (S m0)) (eq nat n (S m0)) (le_n_S n m0 H0))))) m H))). -(* COMMENTS -Initial nodes: 109 -END *) theorem le_or_lt: \forall (n: nat).(\forall (m: nat).(or (le n m) (lt m n))) @@ -438,9 +323,6 @@ n0))).(or_ind (le n0 m0) (lt m0 n0) (or (le (S n0) (S m0)) (lt (S m0) (S n0))) (\lambda (H0: (le n0 m0)).(or_introl (le (S n0) (S m0)) (lt (S m0) (S n0)) (le_n_S n0 m0 H0))) (\lambda (H0: (lt m0 n0)).(or_intror (le (S n0) (S m0)) (lt (S m0) (S n0)) (le_n_S (S m0) n0 H0))) H)))) n m)). -(* COMMENTS -Initial nodes: 209 -END *) theorem plus_n_O: \forall (n: nat).(eq nat n (plus n O)) @@ -448,9 +330,6 @@ theorem plus_n_O: \lambda (n: nat).(nat_ind (\lambda (n0: nat).(eq nat n0 (plus n0 O))) (refl_equal nat O) (\lambda (n0: nat).(\lambda (H: (eq nat n0 (plus n0 O))).(f_equal nat nat S n0 (plus n0 O) H))) n). -(* COMMENTS -Initial nodes: 57 -END *) theorem plus_n_Sm: \forall (n: nat).(\forall (m: nat).(eq nat (S (plus n m)) (plus n (S m)))) @@ -459,9 +338,6 @@ theorem plus_n_Sm: (plus n0 n)) (plus n0 (S n)))) (refl_equal nat (S n)) (\lambda (n0: nat).(\lambda (H: (eq nat (S (plus n0 n)) (plus n0 (S n)))).(f_equal nat nat S (S (plus n0 n)) (plus n0 (S n)) H))) m)). -(* COMMENTS -Initial nodes: 85 -END *) theorem plus_sym: \forall (n: nat).(\forall (m: nat).(eq nat (plus n m) (plus m n))) @@ -471,9 +347,6 @@ n0 m) (plus m n0))) (plus_n_O m) (\lambda (y: nat).(\lambda (H: (eq nat (plus y m) (plus m y))).(eq_ind nat (S (plus m y)) (\lambda (n0: nat).(eq nat (S (plus y m)) n0)) (f_equal nat nat S (plus y m) (plus m y) H) (plus m (S y)) (plus_n_Sm m y)))) n)). -(* COMMENTS -Initial nodes: 111 -END *) theorem plus_Snm_nSm: \forall (n: nat).(\forall (m: nat).(eq nat (plus (S n) m) (plus n (S m)))) @@ -482,9 +355,6 @@ theorem plus_Snm_nSm: nat).(eq nat (S n0) (plus n (S m)))) (eq_ind_r nat (plus (S m) n) (\lambda (n0: nat).(eq nat (S (plus m n)) n0)) (refl_equal nat (plus (S m) n)) (plus n (S m)) (plus_sym n (S m))) (plus n m) (plus_sym n m))). -(* COMMENTS -Initial nodes: 99 -END *) theorem plus_assoc_l: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).(eq nat (plus n (plus m @@ -495,9 +365,6 @@ nat).(eq nat (plus n0 (plus m p)) (plus (plus n0 m) p))) (refl_equal nat (plus m p)) (\lambda (n0: nat).(\lambda (H: (eq nat (plus n0 (plus m p)) (plus (plus n0 m) p))).(f_equal nat nat S (plus n0 (plus m p)) (plus (plus n0 m) p) H))) n))). -(* COMMENTS -Initial nodes: 101 -END *) theorem plus_assoc_r: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).(eq nat (plus (plus n @@ -505,9 +372,6 @@ m) p) (plus n (plus m p))))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(sym_eq nat (plus n (plus m p)) (plus (plus n m) p) (plus_assoc_l n m p)))). -(* COMMENTS -Initial nodes: 37 -END *) theorem simpl_plus_l: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((eq nat (plus n m) @@ -521,9 +385,6 @@ nat).(\lambda (IHn: ((\forall (m: nat).(\forall (p: nat).((eq nat (plus n0 m) nat).(\lambda (H: (eq nat (S (plus n0 m)) (S (plus n0 p)))).(IHn m p (IHn (plus n0 m) (plus n0 p) (f_equal nat nat (plus n0) (plus n0 m) (plus n0 p) (eq_add_S (plus n0 m) (plus n0 p) H))))))))) n). -(* COMMENTS -Initial nodes: 161 -END *) theorem minus_n_O: \forall (n: nat).(eq nat n (minus n O)) @@ -531,9 +392,6 @@ theorem minus_n_O: \lambda (n: nat).(nat_ind (\lambda (n0: nat).(eq nat n0 (minus n0 O))) (refl_equal nat O) (\lambda (n0: nat).(\lambda (_: (eq nat n0 (minus n0 O))).(refl_equal nat (S n0)))) n). -(* COMMENTS -Initial nodes: 47 -END *) theorem minus_n_n: \forall (n: nat).(eq nat O (minus n n)) @@ -541,9 +399,6 @@ theorem minus_n_n: \lambda (n: nat).(nat_ind (\lambda (n0: nat).(eq nat O (minus n0 n0))) (refl_equal nat O) (\lambda (n0: nat).(\lambda (IHn: (eq nat O (minus n0 n0))).IHn)) n). -(* COMMENTS -Initial nodes: 41 -END *) theorem minus_Sn_m: \forall (n: nat).(\forall (m: nat).((le m n) \to (eq nat (S (minus n m)) @@ -555,9 +410,6 @@ n0)))) (\lambda (p: nat).(f_equal nat nat S (minus p O) p (sym_eq nat p (minus p O) (minus_n_O p)))) (\lambda (p: nat).(\lambda (q: nat).(\lambda (_: (le p q)).(\lambda (H0: (eq nat (S (minus q p)) (match p with [O \Rightarrow (S q) | (S l) \Rightarrow (minus q l)]))).H0)))) m n Le))). -(* COMMENTS -Initial nodes: 111 -END *) theorem plus_minus: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((eq nat n (plus m p)) @@ -573,18 +425,12 @@ p)) in (\lambda (H2: (eq nat O (S (plus n0 p)))).(H1 H2))) H0))))) (\lambda (n0: nat).(\lambda (m0: nat).(\lambda (H: (((eq nat m0 (plus n0 p)) \to (eq nat p (minus m0 n0))))).(\lambda (H0: (eq nat (S m0) (S (plus n0 p)))).(H (eq_add_S m0 (plus n0 p) H0)))))) m n))). -(* COMMENTS -Initial nodes: 199 -END *) theorem minus_plus: \forall (n: nat).(\forall (m: nat).(eq nat (minus (plus n m) n) m)) \def \lambda (n: nat).(\lambda (m: nat).(sym_eq nat m (minus (plus n m) n) (plus_minus (plus n m) n m (refl_equal nat (plus n m))))). -(* COMMENTS -Initial nodes: 41 -END *) theorem le_pred_n: \forall (n: nat).(le (pred n) n) @@ -592,9 +438,6 @@ theorem le_pred_n: \lambda (n: nat).(nat_ind (\lambda (n0: nat).(le (pred n0) n0)) (le_n O) (\lambda (n0: nat).(\lambda (_: (le (pred n0) n0)).(le_S (pred (S n0)) n0 (le_n n0)))) n). -(* COMMENTS -Initial nodes: 43 -END *) theorem le_plus_l: \forall (n: nat).(\forall (m: nat).(le n (plus n m))) @@ -603,9 +446,6 @@ theorem le_plus_l: n0 m)))) (\lambda (m: nat).(le_O_n m)) (\lambda (n0: nat).(\lambda (IHn: ((\forall (m: nat).(le n0 (plus n0 m))))).(\lambda (m: nat).(le_n_S n0 (plus n0 m) (IHn m))))) n). -(* COMMENTS -Initial nodes: 55 -END *) theorem le_plus_r: \forall (n: nat).(\forall (m: nat).(le m (plus n m))) @@ -613,9 +453,6 @@ theorem le_plus_r: \lambda (n: nat).(\lambda (m: nat).(nat_ind (\lambda (n0: nat).(le m (plus n0 m))) (le_n m) (\lambda (n0: nat).(\lambda (H: (le m (plus n0 m))).(le_S m (plus n0 m) H))) n)). -(* COMMENTS -Initial nodes: 47 -END *) theorem simpl_le_plus_l: \forall (p: nat).(\forall (n: nat).(\forall (m: nat).((le (plus p n) (plus p @@ -628,9 +465,6 @@ nat).(\lambda (IHp: ((\forall (n: nat).(\forall (m: nat).((le (plus p0 n) (plus p0 m)) \to (le n m)))))).(\lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le (S (plus p0 n)) (S (plus p0 m)))).(IHp n m (le_S_n (plus p0 n) (plus p0 m) H))))))) p). -(* COMMENTS -Initial nodes: 113 -END *) theorem le_plus_trans: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((le n m) \to (le n @@ -638,9 +472,6 @@ theorem le_plus_trans: \def \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (H: (le n m)).(le_trans n m (plus m p) H (le_plus_l m p))))). -(* COMMENTS -Initial nodes: 31 -END *) theorem le_reg_l: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((le n m) \to (le (plus @@ -651,9 +482,6 @@ nat).((le n m) \to (le (plus n0 n) (plus n0 m)))) (\lambda (H: (le n m)).H) (\lambda (p0: nat).(\lambda (IHp: (((le n m) \to (le (plus p0 n) (plus p0 m))))).(\lambda (H: (le n m)).(le_n_S (plus p0 n) (plus p0 m) (IHp H))))) p))). -(* COMMENTS -Initial nodes: 85 -END *) theorem le_plus_plus: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).(\forall (q: nat).((le @@ -664,9 +492,6 @@ nat).(\lambda (H: (le n m)).(\lambda (H0: (le p q)).(le_ind n (\lambda (n0: nat).(le (plus n p) (plus n0 q))) (le_reg_l p q n H0) (\lambda (m0: nat).(\lambda (_: (le n m0)).(\lambda (H2: (le (plus n p) (plus m0 q))).(le_S (plus n p) (plus m0 q) H2)))) m H)))))). -(* COMMENTS -Initial nodes: 91 -END *) theorem le_plus_minus: \forall (n: nat).(\forall (m: nat).((le n m) \to (eq nat m (plus n (minus m @@ -677,9 +502,6 @@ n))))) (\lambda (p: nat).(minus_n_O p)) (\lambda (p: nat).(\lambda (q: nat).(\lambda (_: (le p q)).(\lambda (H0: (eq nat q (plus p (minus q p)))).(f_equal nat nat S q (plus p (minus q p)) H0))))) n m Le))). -(* COMMENTS -Initial nodes: 91 -END *) theorem le_plus_minus_r: \forall (n: nat).(\forall (m: nat).((le n m) \to (eq nat (plus n (minus m @@ -687,9 +509,6 @@ n)) m))) \def \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(sym_eq nat m (plus n (minus m n)) (le_plus_minus n m H)))). -(* COMMENTS -Initial nodes: 33 -END *) theorem simpl_lt_plus_l: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((lt (plus p n) (plus p @@ -700,9 +519,6 @@ nat).((lt (plus n0 n) (plus n0 m)) \to (lt n m))) (\lambda (H: (lt n m)).H) (\lambda (p0: nat).(\lambda (IHp: (((lt (plus p0 n) (plus p0 m)) \to (lt n m)))).(\lambda (H: (lt (S (plus p0 n)) (S (plus p0 m)))).(IHp (le_S_n (S (plus p0 n)) (plus p0 m) H))))) p))). -(* COMMENTS -Initial nodes: 99 -END *) theorem lt_reg_l: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((lt n m) \to (lt (plus @@ -713,9 +529,6 @@ nat).((lt n m) \to (lt (plus n0 n) (plus n0 m)))) (\lambda (H: (lt n m)).H) (\lambda (p0: nat).(\lambda (IHp: (((lt n m) \to (lt (plus p0 n) (plus p0 m))))).(\lambda (H: (lt n m)).(lt_n_S (plus p0 n) (plus p0 m) (IHp H))))) p))). -(* COMMENTS -Initial nodes: 85 -END *) theorem lt_reg_r: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).((lt n m) \to (lt (plus @@ -727,9 +540,6 @@ nat (plus p m) (\lambda (n0: nat).(lt (plus p n) n0)) (nat_ind (\lambda (n0: nat).(lt (plus n0 n) (plus n0 m))) H (\lambda (n0: nat).(\lambda (_: (lt (plus n0 n) (plus n0 m))).(lt_reg_l n m (S n0) H))) p) (plus m p) (plus_sym m p)) (plus n p) (plus_sym n p))))). -(* COMMENTS -Initial nodes: 129 -END *) theorem le_lt_plus_plus: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).(\forall (q: nat).((le @@ -739,9 +549,6 @@ n m) \to ((lt p q) \to (lt (plus n p) (plus m q))))))) nat).(\lambda (H: (le n m)).(\lambda (H0: (le (S p) q)).(eq_ind_r nat (plus n (S p)) (\lambda (n0: nat).(le n0 (plus m q))) (le_plus_plus n m (S p) q H H0) (plus (S n) p) (plus_Snm_nSm n p))))))). -(* COMMENTS -Initial nodes: 75 -END *) theorem lt_le_plus_plus: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).(\forall (q: nat).((lt @@ -750,9 +557,6 @@ n m) \to ((le p q) \to (lt (plus n p) (plus m q))))))) \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (q: nat).(\lambda (H: (le (S n) m)).(\lambda (H0: (le p q)).(le_plus_plus (S n) m p q H H0)))))). -(* COMMENTS -Initial nodes: 37 -END *) theorem lt_plus_plus: \forall (n: nat).(\forall (m: nat).(\forall (p: nat).(\forall (q: nat).((lt @@ -761,14 +565,11 @@ n m) \to ((lt p q) \to (lt (plus n p) (plus m q))))))) \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (q: nat).(\lambda (H: (lt n m)).(\lambda (H0: (lt p q)).(lt_le_plus_plus n m p q H (lt_le_weak p q H0))))))). -(* COMMENTS -Initial nodes: 39 -END *) theorem well_founded_ltof: - \forall (A: Set).(\forall (f: ((A \to nat))).(well_founded A (ltof A f))) + \forall (A: Type[0]).(\forall (f: ((A \to nat))).(well_founded A (ltof A f))) \def - \lambda (A: Set).(\lambda (f: ((A \to nat))).(let H \def (\lambda (n: + \lambda (A: Type[0]).(\lambda (f: ((A \to nat))).(let H \def (\lambda (n: nat).(nat_ind (\lambda (n0: nat).(\forall (a: A).((lt (f a) n0) \to (Acc A (ltof A f) a)))) (\lambda (a: A).(\lambda (H: (lt (f a) O)).(False_ind (Acc A (ltof A f) a) (let H0 \def H in ((let H1 \def (lt_n_O (f a)) in (\lambda (H2: @@ -778,17 +579,11 @@ nat).(nat_ind (\lambda (n0: nat).(\forall (a: A).((lt (f a) n0) \to (Acc A (ltfafb: (lt (f b) (f a))).(IHn b (lt_le_trans (f b) (f a) n0 ltfafb (lt_n_Sm_le (f a) n0 ltSma)))))))))) n)) in (\lambda (a: A).(H (S (f a)) a (le_n (S (f a))))))). -(* COMMENTS -Initial nodes: 189 -END *) theorem lt_wf: well_founded nat lt \def well_founded_ltof nat (\lambda (m: nat).m). -(* COMMENTS -Initial nodes: 7 -END *) theorem lt_wf_ind: \forall (p: nat).(\forall (P: ((nat \to Prop))).(((\forall (n: @@ -799,7 +594,4 @@ nat).(((\forall (m: nat).((lt m n) \to (P m)))) \to (P n))))).(Acc_ind nat lt (\lambda (n: nat).(P n)) (\lambda (x: nat).(\lambda (_: ((\forall (y: nat).((lt y x) \to (Acc nat lt y))))).(\lambda (H1: ((\forall (y: nat).((lt y x) \to (P y))))).(H x H1)))) p (lt_wf p)))). -(* COMMENTS -Initial nodes: 77 -END *) diff --git a/matita/matita/contribs/lambdadelta/legacy_1/definitions.ma b/matita/matita/contribs/lambdadelta/legacy_1/definitions.ma index 63fc85890..bcdc2a0a8 100644 --- a/matita/matita/contribs/lambdadelta/legacy_1/definitions.ma +++ b/matita/matita/contribs/lambdadelta/legacy_1/definitions.ma @@ -14,5 +14,5 @@ (* This file was automatically generated: do not edit *********************) -include "Legacy-1/coq/defs.ma". +include "legacy_1/coq/defs.ma". diff --git a/matita/matita/contribs/lambdadelta/legacy_1/preamble.ma b/matita/matita/contribs/lambdadelta/legacy_1/preamble.ma index 96c1bc1fa..5466cb15e 100644 --- a/matita/matita/contribs/lambdadelta/legacy_1/preamble.ma +++ b/matita/matita/contribs/lambdadelta/legacy_1/preamble.ma @@ -12,4 +12,6 @@ (* *) (**************************************************************************) +include "basics/pts.ma". + inductive False: Prop \def . diff --git a/matita/matita/contribs/lambdadelta/legacy_1/spare.ma b/matita/matita/contribs/lambdadelta/legacy_1/spare.ma index 77939a1b6..b276321ed 100644 --- a/matita/matita/contribs/lambdadelta/legacy_1/spare.ma +++ b/matita/matita/contribs/lambdadelta/legacy_1/spare.ma @@ -14,5 +14,5 @@ (* This file was automatically generated: do not edit *********************) -include "Legacy-1/theory.ma". +include "legacy_1/theory.ma". diff --git a/matita/matita/contribs/lambdadelta/legacy_1/theory.ma b/matita/matita/contribs/lambdadelta/legacy_1/theory.ma index 4ee597e09..17a1ec960 100644 --- a/matita/matita/contribs/lambdadelta/legacy_1/theory.ma +++ b/matita/matita/contribs/lambdadelta/legacy_1/theory.ma @@ -14,5 +14,5 @@ (* This file was automatically generated: do not edit *********************) -include "Legacy-1/coq/props.ma". +include "legacy_1/coq/props.ma".