(* This file was automatically generated: do not edit *********************)
-include "legacy_1/coq/elim.ma".
+include "legacy_1/coq/fwd.ma".
theorem f_equal:
\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: 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)))))).
+B))).(\lambda (x: A).(\lambda (y: A).(\lambda (H: (eq A x y)).(let TMP_3 \def
+(\lambda (a: A).(let TMP_1 \def (f x) in (let TMP_2 \def (f a) in (eq B TMP_1
+TMP_2)))) in (let TMP_4 \def (f x) in (let TMP_5 \def (refl_equal B TMP_4) in
+(eq_ind A x TMP_3 TMP_5 y H))))))))).
theorem f_equal2:
\forall (A1: Type[0]).(\forall (A2: Type[0]).(\forall (B: Type[0]).(\forall
\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))))))))).
+A2).(\lambda (y2: A2).(\lambda (H: (eq A1 x1 y1)).(let TMP_3 \def (\lambda
+(a: A1).((eq A2 x2 y2) \to (let TMP_1 \def (f x1 x2) in (let TMP_2 \def (f a
+y2) in (eq B TMP_1 TMP_2))))) in (let TMP_9 \def (\lambda (H0: (eq A2 x2
+y2)).(let TMP_6 \def (\lambda (a: A2).(let TMP_4 \def (f x1 x2) in (let TMP_5
+\def (f x1 a) in (eq B TMP_4 TMP_5)))) in (let TMP_7 \def (f x1 x2) in (let
+TMP_8 \def (refl_equal B TMP_7) in (eq_ind A2 x2 TMP_6 TMP_8 y2 H0))))) in
+(eq_ind A1 x1 TMP_3 TMP_9 y1 H))))))))))).
theorem f_equal3:
\forall (A1: Type[0]).(\forall (A2: Type[0]).(\forall (A3: Type[0]).(\forall
\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)))))))))))).
+A3).(\lambda (y3: A3).(\lambda (H: (eq A1 x1 y1)).(let TMP_3 \def (\lambda
+(a: A1).((eq A2 x2 y2) \to ((eq A3 x3 y3) \to (let TMP_1 \def (f x1 x2 x3) in
+(let TMP_2 \def (f a y2 y3) in (eq B TMP_1 TMP_2)))))) in (let TMP_13 \def
+(\lambda (H0: (eq A2 x2 y2)).(let TMP_6 \def (\lambda (a: A2).((eq A3 x3 y3)
+\to (let TMP_4 \def (f x1 x2 x3) in (let TMP_5 \def (f x1 a y3) in (eq B
+TMP_4 TMP_5))))) in (let TMP_12 \def (\lambda (H1: (eq A3 x3 y3)).(let TMP_9
+\def (\lambda (a: A3).(let TMP_7 \def (f x1 x2 x3) in (let TMP_8 \def (f x1
+x2 a) in (eq B TMP_7 TMP_8)))) in (let TMP_10 \def (f x1 x2 x3) in (let
+TMP_11 \def (refl_equal B TMP_10) in (eq_ind A3 x3 TMP_9 TMP_11 y3 H1))))) in
+(eq_ind A2 x2 TMP_6 TMP_12 y2 H0)))) in (eq_ind A1 x1 TMP_3 TMP_13 y1
+H)))))))))))))).
theorem sym_eq:
\forall (A: Type[0]).(\forall (x: A).(\forall (y: A).((eq A x y) \to (eq A y
x))))
\def
\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)))).
+y)).(let TMP_1 \def (\lambda (a: A).(eq A a x)) in (let TMP_2 \def
+(refl_equal A x) in (eq_ind A x TMP_1 TMP_2 y H)))))).
theorem eq_ind_r:
\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: 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])))))).
+(H: (P x)).(\lambda (y: A).(\lambda (H0: (eq A y x)).(let TMP_1 \def (sym_eq
+A y x H0) in (match TMP_1 with [refl_equal \Rightarrow H]))))))).
theorem trans_eq:
\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: 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)))))).
+A).(\lambda (H: (eq A x y)).(\lambda (H0: (eq A y z)).(let TMP_1 \def
+(\lambda (a: A).(eq A x a)) in (eq_ind A y TMP_1 H z H0))))))).
theorem sym_not_eq:
\forall (A: Type[0]).(\forall (x: A).(\forall (y: A).((not (eq A x y)) \to
(not (eq A y x)))))
\def
\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)))))).
+A x y))).(\lambda (h2: (eq A y x)).(let TMP_1 \def (\lambda (a: A).(eq A a
+y)) in (let TMP_2 \def (refl_equal A y) in (let TMP_3 \def (eq_ind A y TMP_1
+TMP_2 x h2) in (h1 TMP_3)))))))).
theorem nat_double_ind:
\forall (R: ((nat \to (nat \to Prop)))).(((\forall (n: nat).(R O n))) \to
\lambda (R: ((nat \to (nat \to Prop)))).(\lambda (H: ((\forall (n: nat).(R O
n)))).(\lambda (H0: ((\forall (n: nat).(R (S n) O)))).(\lambda (H1: ((\forall
(n: nat).(\forall (m: nat).((R n m) \to (R (S n) (S m))))))).(\lambda (n:
-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))))).
+nat).(let TMP_1 \def (\lambda (n0: nat).(\forall (m: nat).(R n0 m))) in (let
+TMP_7 \def (\lambda (n0: nat).(\lambda (H2: ((\forall (m: nat).(R n0
+m)))).(\lambda (m: nat).(let TMP_3 \def (\lambda (n1: nat).(let TMP_2 \def (S
+n0) in (R TMP_2 n1))) in (let TMP_4 \def (H0 n0) in (let TMP_6 \def (\lambda
+(n1: nat).(\lambda (_: (R (S n0) n1)).(let TMP_5 \def (H2 n1) in (H1 n0 n1
+TMP_5)))) in (nat_ind TMP_3 TMP_4 TMP_6 m))))))) in (nat_ind TMP_1 H TMP_7
+n))))))).
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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (eq nat (S n) (S m))).(let
+TMP_1 \def (S n) in (let TMP_2 \def (S m) in (f_equal nat nat pred TMP_1
+TMP_2 H))))).
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))).
+ \lambda (n: nat).(\lambda (H: (eq nat O (S n))).(let TMP_1 \def (S n) in
+(let TMP_2 \def (\lambda (n0: nat).(IsSucc n0)) in (let TMP_3 \def (S n) in
+(let TMP_4 \def (sym_eq nat O TMP_3 H) in (eq_ind nat TMP_1 TMP_2 I O
+TMP_4)))))).
theorem not_eq_S:
\forall (n: nat).(\forall (m: nat).((not (eq nat n m)) \to (not (eq nat (S
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))))).
+(H0: (eq nat (S n) (S m))).(let TMP_1 \def (eq_add_S n m H0) in (H TMP_1))))).
theorem pred_Sn:
\forall (m: nat).(eq nat m (pred (S m)))
\def
- \lambda (m: nat).(refl_equal nat (pred (S m))).
+ \lambda (m: nat).(let TMP_1 \def (S m) in (let TMP_2 \def (pred TMP_1) in
+(refl_equal nat TMP_2))).
theorem S_pred:
\forall (n: nat).(\forall (m: nat).((lt m n) \to (eq nat n (S (pred n)))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (lt m n)).(le_ind (S m)
-(\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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (lt m n)).(let TMP_1 \def (S
+m) in (let TMP_4 \def (\lambda (n0: nat).(let TMP_2 \def (pred n0) in (let
+TMP_3 \def (S TMP_2) in (eq nat n0 TMP_3)))) in (let TMP_5 \def (S m) in (let
+TMP_6 \def (pred TMP_5) in (let TMP_7 \def (S TMP_6) in (let TMP_8 \def
+(refl_equal nat TMP_7) in (let TMP_12 \def (\lambda (m0: nat).(\lambda (_:
+(le (S m) m0)).(\lambda (_: (eq nat m0 (S (pred m0)))).(let TMP_9 \def (S m0)
+in (let TMP_10 \def (pred TMP_9) in (let TMP_11 \def (S TMP_10) in
+(refl_equal nat TMP_11))))))) in (le_ind TMP_1 TMP_4 TMP_8 TMP_12 n
+H)))))))))).
theorem le_trans:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).((le n m) \to ((le m p)
\to (le n p)))))
\def
\lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (H: (le n
-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))))).
+m)).(\lambda (H0: (le m p)).(let TMP_1 \def (\lambda (n0: nat).(le n n0)) in
+(let TMP_2 \def (\lambda (m0: nat).(\lambda (_: (le m m0)).(\lambda (IHle:
+(le n m0)).(le_S n m0 IHle)))) in (le_ind m TMP_1 H TMP_2 p H0))))))).
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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le (S n) m)).(let TMP_1
+\def (S n) in (let TMP_2 \def (le_n n) in (let TMP_3 \def (le_S n n TMP_2) in
+(le_trans n TMP_1 m TMP_3 H)))))).
theorem le_n_S:
\forall (n: nat).(\forall (m: nat).((le n m) \to (le (S n) (S m))))
\def
- \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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(let TMP_3 \def
+(\lambda (n0: nat).(let TMP_1 \def (S n) in (let TMP_2 \def (S n0) in (le
+TMP_1 TMP_2)))) in (let TMP_4 \def (S n) in (let TMP_5 \def (le_n TMP_4) in
+(let TMP_8 \def (\lambda (m0: nat).(\lambda (_: (le n m0)).(\lambda (IHle:
+(le (S n) (S m0))).(let TMP_6 \def (S n) in (let TMP_7 \def (S m0) in (le_S
+TMP_6 TMP_7 IHle)))))) in (le_ind n TMP_3 TMP_5 TMP_8 m H))))))).
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).
+ \lambda (n: nat).(let TMP_1 \def (\lambda (n0: nat).(le O n0)) in (let TMP_2
+\def (le_n O) in (let TMP_3 \def (\lambda (n0: nat).(\lambda (IHn: (le O
+n0)).(le_S O n0 IHn))) in (nat_ind TMP_1 TMP_2 TMP_3 n)))).
theorem le_S_n:
\forall (n: nat).(\forall (m: nat).((le (S n) (S m)) \to (le n m)))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le (S n) (S m))).(le_ind (S
-n) (\lambda (n0: nat).(le (pred (S n)) (pred n0))) (le_n n) (\lambda (m0:
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le (S n) (S m))).(let TMP_1
+\def (S n) in (let TMP_5 \def (\lambda (n0: nat).(let TMP_2 \def (S n) in
+(let TMP_3 \def (pred TMP_2) in (let TMP_4 \def (pred n0) in (le TMP_3
+TMP_4))))) in (let TMP_6 \def (le_n n) in (let TMP_7 \def (\lambda (m0:
nat).(\lambda (H0: (le (S n) m0)).(\lambda (_: (le n (pred m0))).(le_trans_S
-n m0 H0)))) (S m) H))).
+n m0 H0)))) in (let TMP_8 \def (S m) in (le_ind TMP_1 TMP_5 TMP_6 TMP_7 TMP_8
+H)))))))).
theorem le_Sn_O:
\forall (n: nat).(not (le (S n) O))
\def
- \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)).
+ \lambda (n: nat).(\lambda (H: (le (S n) O)).(let TMP_1 \def (S n) in (let
+TMP_2 \def (\lambda (n0: nat).(IsSucc n0)) in (let TMP_3 \def (\lambda (m:
+nat).(\lambda (_: (le (S n) m)).(\lambda (_: (IsSucc m)).I))) in (le_ind
+TMP_1 TMP_2 I TMP_3 O H))))).
theorem le_Sn_n:
\forall (n: nat).(not (le (S n) n))
\def
- \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).
+ \lambda (n: nat).(let TMP_3 \def (\lambda (n0: nat).(let TMP_1 \def (S n0)
+in (let TMP_2 \def (le TMP_1 n0) in (not TMP_2)))) in (let TMP_4 \def
+(le_Sn_O O) in (let TMP_7 \def (\lambda (n0: nat).(\lambda (IHn: (not (le (S
+n0) n0))).(\lambda (H: (le (S (S n0)) (S n0))).(let TMP_5 \def (S n0) in (let
+TMP_6 \def (le_S_n TMP_5 n0 H) in (IHn TMP_6)))))) in (nat_ind TMP_3 TMP_4
+TMP_7 n)))).
theorem le_antisym:
\forall (n: nat).(\forall (m: nat).((le n m) \to ((le m n) \to (eq nat n
m))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (h: (le n m)).(le_ind n (\lambda
-(n0: nat).((le n0 n) \to (eq nat n n0))) (\lambda (_: (le n n)).(refl_equal
-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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (h: (le n m)).(let TMP_1 \def
+(\lambda (n0: nat).((le n0 n) \to (eq nat n n0))) in (let TMP_2 \def (\lambda
+(_: (le n n)).(refl_equal nat n)) in (let TMP_8 \def (\lambda (m0:
+nat).(\lambda (H: (le n m0)).(\lambda (_: (((le m0 n) \to (eq nat n
+m0)))).(\lambda (H1: (le (S m0) n)).(let TMP_3 \def (S m0) in (let TMP_4 \def
+(eq nat n TMP_3) in (let TMP_5 \def (S m0) in (let H2 \def (le_trans TMP_5 n
+m0 H1 H) in (let H3 \def (le_Sn_n m0) in (let TMP_6 \def (\lambda (H4: (le (S
+m0) m0)).(H3 H4)) in (let TMP_7 \def (TMP_6 H2) in (False_ind TMP_4
+TMP_7)))))))))))) in (le_ind n TMP_1 TMP_2 TMP_8 m h)))))).
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)).
+ \lambda (n: nat).(\lambda (H: (le n O)).(let TMP_1 \def (le_O_n n) in
+(le_antisym O n TMP_1 H))).
theorem le_elim_rel:
\forall (P: ((nat \to (nat \to Prop)))).(((\forall (p: nat).(P O p))) \to
\def
\lambda (P: ((nat \to (nat \to Prop)))).(\lambda (H: ((\forall (p: nat).(P O
p)))).(\lambda (H0: ((\forall (p: nat).(\forall (q: nat).((le p q) \to ((P p
-q) \to (P (S p) (S q)))))))).(\lambda (n: nat).(nat_ind (\lambda (n0:
-nat).(\forall (m: nat).((le n0 m) \to (P n0 m)))) (\lambda (m: nat).(\lambda
-(_: (le O m)).(H m))) (\lambda (n0: nat).(\lambda (IHn: ((\forall (m:
-nat).((le n0 m) \to (P n0 m))))).(\lambda (m: nat).(\lambda (Le: (le (S n0)
-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)))).
+q) \to (P (S p) (S q)))))))).(\lambda (n: nat).(let TMP_1 \def (\lambda (n0:
+nat).(\forall (m: nat).((le n0 m) \to (P n0 m)))) in (let TMP_2 \def (\lambda
+(m: nat).(\lambda (_: (le O m)).(H m))) in (let TMP_14 \def (\lambda (n0:
+nat).(\lambda (IHn: ((\forall (m: nat).((le n0 m) \to (P n0 m))))).(\lambda
+(m: nat).(\lambda (Le: (le (S n0) m)).(let TMP_3 \def (S n0) in (let TMP_5
+\def (\lambda (n1: nat).(let TMP_4 \def (S n0) in (P TMP_4 n1))) in (let
+TMP_6 \def (le_n n0) in (let TMP_7 \def (le_n n0) in (let TMP_8 \def (IHn n0
+TMP_7) in (let TMP_9 \def (H0 n0 n0 TMP_6 TMP_8) in (let TMP_13 \def (\lambda
+(m0: nat).(\lambda (H1: (le (S n0) m0)).(\lambda (_: (P (S n0) m0)).(let
+TMP_10 \def (le_trans_S n0 m0 H1) in (let TMP_11 \def (le_trans_S n0 m0 H1)
+in (let TMP_12 \def (IHn m0 TMP_11) in (H0 n0 m0 TMP_10 TMP_12))))))) in
+(le_ind TMP_3 TMP_5 TMP_9 TMP_13 m Le)))))))))))) in (nat_ind TMP_1 TMP_2
+TMP_14 n))))))).
theorem lt_n_n:
\forall (n: nat).(not (lt n n))
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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (lt n m)).(let TMP_1 \def (S
+n) in (le_n_S TMP_1 m H)))).
theorem lt_n_Sn:
\forall (n: nat).(lt n (S n))
\def
- \lambda (n: nat).(le_n (S n)).
+ \lambda (n: nat).(let TMP_1 \def (S n) in (le_n TMP_1)).
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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (lt (S n) (S m))).(let TMP_1
+\def (S n) in (le_S_n TMP_1 m H)))).
theorem lt_n_O:
\forall (n: nat).(not (lt n O))
\to (lt n p)))))
\def
\lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (H: (lt n
-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))))).
+m)).(\lambda (H0: (lt m p)).(let TMP_1 \def (S m) in (let TMP_2 \def (\lambda
+(n0: nat).(lt n n0)) in (let TMP_3 \def (S n) in (let TMP_4 \def (le_S TMP_3
+m H) in (let TMP_6 \def (\lambda (m0: nat).(\lambda (_: (le (S m)
+m0)).(\lambda (IHle: (lt n m0)).(let TMP_5 \def (S n) in (le_S TMP_5 m0
+IHle))))) in (le_ind TMP_1 TMP_2 TMP_4 TMP_6 p H0)))))))))).
theorem lt_O_Sn:
\forall (n: nat).(lt O (S n))
\def
- \lambda (n: nat).(le_n_S O n (le_O_n n)).
+ \lambda (n: nat).(let TMP_1 \def (le_O_n n) in (le_n_S O n TMP_1)).
theorem lt_le_S:
\forall (n: nat).(\forall (p: nat).((lt n p) \to (le (S n) p)))
theorem le_not_lt:
\forall (n: nat).(\forall (m: nat).((le n m) \to (not (lt m n))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(le_ind n (\lambda
-(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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(let TMP_2 \def
+(\lambda (n0: nat).(let TMP_1 \def (lt n0 n) in (not TMP_1))) in (let TMP_3
+\def (lt_n_n n) in (let TMP_6 \def (\lambda (m0: nat).(\lambda (_: (le n
+m0)).(\lambda (IHle: (not (lt m0 n))).(\lambda (H1: (lt (S m0) n)).(let TMP_4
+\def (S m0) in (let TMP_5 \def (le_trans_S TMP_4 n H1) in (IHle TMP_5)))))))
+in (le_ind n TMP_2 TMP_3 TMP_6 m H)))))).
theorem le_lt_n_Sm:
\forall (n: nat).(\forall (m: nat).((le n m) \to (lt n (S m))))
\to (lt n p)))))
\def
\lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (H: (le n
-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))))).
+m)).(\lambda (H0: (lt m p)).(let TMP_1 \def (S m) in (let TMP_2 \def (\lambda
+(n0: nat).(lt n n0)) in (let TMP_3 \def (le_n_S n m H) in (let TMP_5 \def
+(\lambda (m0: nat).(\lambda (_: (le (S m) m0)).(\lambda (IHle: (lt n
+m0)).(let TMP_4 \def (S n) in (le_S TMP_4 m0 IHle))))) in (le_ind TMP_1 TMP_2
+TMP_3 TMP_5 p H0))))))))).
theorem lt_le_trans:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).((lt n m) \to ((le m p)
\to (lt n p)))))
\def
\lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (H: (lt n
-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))))).
+m)).(\lambda (H0: (le m p)).(let TMP_1 \def (\lambda (n0: nat).(lt n n0)) in
+(let TMP_3 \def (\lambda (m0: nat).(\lambda (_: (le m m0)).(\lambda (IHle:
+(lt n m0)).(let TMP_2 \def (S n) in (le_S TMP_2 m0 IHle))))) in (le_ind m
+TMP_1 H TMP_3 p H0))))))).
theorem lt_le_weak:
\forall (n: nat).(\forall (m: nat).((lt n m) \to (le n m)))
theorem le_lt_or_eq:
\forall (n: nat).(\forall (m: nat).((le n m) \to (or (lt n m) (eq nat n m))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(le_ind n (\lambda
-(n0: nat).(or (lt n n0) (eq nat n n0))) (or_intror (lt n n) (eq nat n n)
-(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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(let TMP_3 \def
+(\lambda (n0: nat).(let TMP_1 \def (lt n n0) in (let TMP_2 \def (eq nat n n0)
+in (or TMP_1 TMP_2)))) in (let TMP_4 \def (lt n n) in (let TMP_5 \def (eq nat
+n n) in (let TMP_6 \def (refl_equal nat n) in (let TMP_7 \def (or_intror
+TMP_4 TMP_5 TMP_6) in (let TMP_13 \def (\lambda (m0: nat).(\lambda (H0: (le n
+m0)).(\lambda (_: (or (lt n m0) (eq nat n m0))).(let TMP_8 \def (S m0) in
+(let TMP_9 \def (lt n TMP_8) in (let TMP_10 \def (S m0) in (let TMP_11 \def
+(eq nat n TMP_10) in (let TMP_12 \def (le_n_S n m0 H0) in (or_introl TMP_9
+TMP_11 TMP_12))))))))) in (le_ind n TMP_3 TMP_7 TMP_13 m H))))))))).
theorem le_or_lt:
\forall (n: nat).(\forall (m: nat).(or (le n m) (lt m n)))
\def
- \lambda (n: nat).(\lambda (m: nat).(nat_double_ind (\lambda (n0:
-nat).(\lambda (n1: nat).(or (le n0 n1) (lt n1 n0)))) (\lambda (n0:
-nat).(or_introl (le O n0) (lt n0 O) (le_O_n n0))) (\lambda (n0:
-nat).(or_intror (le (S n0) O) (lt O (S n0)) (lt_le_S O (S n0) (lt_O_Sn n0))))
-(\lambda (n0: nat).(\lambda (m0: nat).(\lambda (H: (or (le n0 m0) (lt m0
-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)).
+ \lambda (n: nat).(\lambda (m: nat).(let TMP_3 \def (\lambda (n0:
+nat).(\lambda (n1: nat).(let TMP_1 \def (le n0 n1) in (let TMP_2 \def (lt n1
+n0) in (or TMP_1 TMP_2))))) in (let TMP_7 \def (\lambda (n0: nat).(let TMP_4
+\def (le O n0) in (let TMP_5 \def (lt n0 O) in (let TMP_6 \def (le_O_n n0) in
+(or_introl TMP_4 TMP_5 TMP_6))))) in (let TMP_15 \def (\lambda (n0: nat).(let
+TMP_8 \def (S n0) in (let TMP_9 \def (le TMP_8 O) in (let TMP_10 \def (S n0)
+in (let TMP_11 \def (lt O TMP_10) in (let TMP_12 \def (S n0) in (let TMP_13
+\def (lt_O_Sn n0) in (let TMP_14 \def (lt_le_S O TMP_12 TMP_13) in (or_intror
+TMP_9 TMP_11 TMP_14))))))))) in (let TMP_42 \def (\lambda (n0: nat).(\lambda
+(m0: nat).(\lambda (H: (or (le n0 m0) (lt m0 n0))).(let TMP_16 \def (le n0
+m0) in (let TMP_17 \def (lt m0 n0) in (let TMP_18 \def (S n0) in (let TMP_19
+\def (S m0) in (let TMP_20 \def (le TMP_18 TMP_19) in (let TMP_21 \def (S m0)
+in (let TMP_22 \def (S n0) in (let TMP_23 \def (lt TMP_21 TMP_22) in (let
+TMP_24 \def (or TMP_20 TMP_23) in (let TMP_32 \def (\lambda (H0: (le n0
+m0)).(let TMP_25 \def (S n0) in (let TMP_26 \def (S m0) in (let TMP_27 \def
+(le TMP_25 TMP_26) in (let TMP_28 \def (S m0) in (let TMP_29 \def (S n0) in
+(let TMP_30 \def (lt TMP_28 TMP_29) in (let TMP_31 \def (le_n_S n0 m0 H0) in
+(or_introl TMP_27 TMP_30 TMP_31))))))))) in (let TMP_41 \def (\lambda (H0:
+(lt m0 n0)).(let TMP_33 \def (S n0) in (let TMP_34 \def (S m0) in (let TMP_35
+\def (le TMP_33 TMP_34) in (let TMP_36 \def (S m0) in (let TMP_37 \def (S n0)
+in (let TMP_38 \def (lt TMP_36 TMP_37) in (let TMP_39 \def (S m0) in (let
+TMP_40 \def (le_n_S TMP_39 n0 H0) in (or_intror TMP_35 TMP_38
+TMP_40)))))))))) in (or_ind TMP_16 TMP_17 TMP_24 TMP_32 TMP_41
+H))))))))))))))) in (nat_double_ind TMP_3 TMP_7 TMP_15 TMP_42 n m)))))).
theorem plus_n_O:
\forall (n: nat).(eq nat n (plus n O))
\def
- \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).
+ \lambda (n: nat).(let TMP_2 \def (\lambda (n0: nat).(let TMP_1 \def (plus n0
+O) in (eq nat n0 TMP_1))) in (let TMP_3 \def (refl_equal nat O) in (let TMP_5
+\def (\lambda (n0: nat).(\lambda (H: (eq nat n0 (plus n0 O))).(let TMP_4 \def
+(plus n0 O) in (f_equal nat nat S n0 TMP_4 H)))) in (nat_ind TMP_2 TMP_3
+TMP_5 n)))).
theorem plus_n_Sm:
\forall (n: nat).(\forall (m: nat).(eq nat (S (plus n m)) (plus n (S m))))
\def
- \lambda (m: nat).(\lambda (n: nat).(nat_ind (\lambda (n0: nat).(eq nat (S
-(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)).
+ \lambda (m: nat).(\lambda (n: nat).(let TMP_5 \def (\lambda (n0: nat).(let
+TMP_1 \def (plus n0 n) in (let TMP_2 \def (S TMP_1) in (let TMP_3 \def (S n)
+in (let TMP_4 \def (plus n0 TMP_3) in (eq nat TMP_2 TMP_4)))))) in (let TMP_6
+\def (S n) in (let TMP_7 \def (refl_equal nat TMP_6) in (let TMP_12 \def
+(\lambda (n0: nat).(\lambda (H: (eq nat (S (plus n0 n)) (plus n0 (S
+n)))).(let TMP_8 \def (plus n0 n) in (let TMP_9 \def (S TMP_8) in (let TMP_10
+\def (S n) in (let TMP_11 \def (plus n0 TMP_10) in (f_equal nat nat S TMP_9
+TMP_11 H))))))) in (nat_ind TMP_5 TMP_7 TMP_12 m)))))).
theorem plus_sym:
\forall (n: nat).(\forall (m: nat).(eq nat (plus n m) (plus m n)))
\def
- \lambda (n: nat).(\lambda (m: nat).(nat_ind (\lambda (n0: nat).(eq nat (plus
-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)).
+ \lambda (n: nat).(\lambda (m: nat).(let TMP_3 \def (\lambda (n0: nat).(let
+TMP_1 \def (plus n0 m) in (let TMP_2 \def (plus m n0) in (eq nat TMP_1
+TMP_2)))) in (let TMP_4 \def (plus_n_O m) in (let TMP_16 \def (\lambda (y:
+nat).(\lambda (H: (eq nat (plus y m) (plus m y))).(let TMP_5 \def (plus m y)
+in (let TMP_6 \def (S TMP_5) in (let TMP_9 \def (\lambda (n0: nat).(let TMP_7
+\def (plus y m) in (let TMP_8 \def (S TMP_7) in (eq nat TMP_8 n0)))) in (let
+TMP_10 \def (plus y m) in (let TMP_11 \def (plus m y) in (let TMP_12 \def
+(f_equal nat nat S TMP_10 TMP_11 H) in (let TMP_13 \def (S y) in (let TMP_14
+\def (plus m TMP_13) in (let TMP_15 \def (plus_n_Sm m y) in (eq_ind nat TMP_6
+TMP_9 TMP_12 TMP_14 TMP_15)))))))))))) in (nat_ind TMP_3 TMP_4 TMP_16 n))))).
theorem plus_Snm_nSm:
\forall (n: nat).(\forall (m: nat).(eq nat (plus (S n) m) (plus n (S m))))
\def
- \lambda (n: nat).(\lambda (m: nat).(eq_ind_r nat (plus m n) (\lambda (n0:
-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))).
+ \lambda (n: nat).(\lambda (m: nat).(let TMP_1 \def (plus m n) in (let TMP_5
+\def (\lambda (n0: nat).(let TMP_2 \def (S n0) in (let TMP_3 \def (S m) in
+(let TMP_4 \def (plus n TMP_3) in (eq nat TMP_2 TMP_4))))) in (let TMP_6 \def
+(S m) in (let TMP_7 \def (plus TMP_6 n) in (let TMP_10 \def (\lambda (n0:
+nat).(let TMP_8 \def (plus m n) in (let TMP_9 \def (S TMP_8) in (eq nat TMP_9
+n0)))) in (let TMP_11 \def (S m) in (let TMP_12 \def (plus TMP_11 n) in (let
+TMP_13 \def (refl_equal nat TMP_12) in (let TMP_14 \def (S m) in (let TMP_15
+\def (plus n TMP_14) in (let TMP_16 \def (S m) in (let TMP_17 \def (plus_sym
+n TMP_16) in (let TMP_18 \def (eq_ind_r nat TMP_7 TMP_10 TMP_13 TMP_15
+TMP_17) in (let TMP_19 \def (plus n m) in (let TMP_20 \def (plus_sym n m) in
+(eq_ind_r nat TMP_1 TMP_5 TMP_18 TMP_19 TMP_20))))))))))))))))).
theorem plus_assoc_l:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).(eq nat (plus n (plus m
p)) (plus (plus n m) p))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(nat_ind (\lambda (n0:
-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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(let TMP_5 \def
+(\lambda (n0: nat).(let TMP_1 \def (plus m p) in (let TMP_2 \def (plus n0
+TMP_1) in (let TMP_3 \def (plus n0 m) in (let TMP_4 \def (plus TMP_3 p) in
+(eq nat TMP_2 TMP_4)))))) in (let TMP_6 \def (plus m p) in (let TMP_7 \def
+(refl_equal nat TMP_6) in (let TMP_12 \def (\lambda (n0: nat).(\lambda (H:
+(eq nat (plus n0 (plus m p)) (plus (plus n0 m) p))).(let TMP_8 \def (plus m
+p) in (let TMP_9 \def (plus n0 TMP_8) in (let TMP_10 \def (plus n0 m) in (let
+TMP_11 \def (plus TMP_10 p) in (f_equal nat nat S TMP_9 TMP_11 H))))))) in
+(nat_ind TMP_5 TMP_7 TMP_12 n))))))).
theorem plus_assoc_r:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).(eq nat (plus (plus n
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)))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(let TMP_1 \def (plus m
+p) in (let TMP_2 \def (plus n TMP_1) in (let TMP_3 \def (plus n m) in (let
+TMP_4 \def (plus TMP_3 p) in (let TMP_5 \def (plus_assoc_l n m p) in (sym_eq
+nat TMP_2 TMP_4 TMP_5)))))))).
theorem simpl_plus_l:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).((eq nat (plus n m)
(plus n p)) \to (eq nat m p))))
\def
- \lambda (n: nat).(nat_ind (\lambda (n0: nat).(\forall (m: nat).(\forall (p:
-nat).((eq nat (plus n0 m) (plus n0 p)) \to (eq nat m p))))) (\lambda (m:
-nat).(\lambda (p: nat).(\lambda (H: (eq nat m p)).H))) (\lambda (n0:
-nat).(\lambda (IHn: ((\forall (m: nat).(\forall (p: nat).((eq nat (plus n0 m)
-(plus n0 p)) \to (eq nat m p)))))).(\lambda (m: nat).(\lambda (p:
-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).
+ \lambda (n: nat).(let TMP_1 \def (\lambda (n0: nat).(\forall (m:
+nat).(\forall (p: nat).((eq nat (plus n0 m) (plus n0 p)) \to (eq nat m p)))))
+in (let TMP_2 \def (\lambda (m: nat).(\lambda (p: nat).(\lambda (H: (eq nat m
+p)).H))) in (let TMP_13 \def (\lambda (n0: nat).(\lambda (IHn: ((\forall (m:
+nat).(\forall (p: nat).((eq nat (plus n0 m) (plus n0 p)) \to (eq nat m
+p)))))).(\lambda (m: nat).(\lambda (p: nat).(\lambda (H: (eq nat (S (plus n0
+m)) (S (plus n0 p)))).(let TMP_3 \def (plus n0 m) in (let TMP_4 \def (plus n0
+p) in (let TMP_5 \def (plus n0) in (let TMP_6 \def (plus n0 m) in (let TMP_7
+\def (plus n0 p) in (let TMP_8 \def (plus n0 m) in (let TMP_9 \def (plus n0
+p) in (let TMP_10 \def (eq_add_S TMP_8 TMP_9 H) in (let TMP_11 \def (f_equal
+nat nat TMP_5 TMP_6 TMP_7 TMP_10) in (let TMP_12 \def (IHn TMP_3 TMP_4
+TMP_11) in (IHn m p TMP_12)))))))))))))))) in (nat_ind TMP_1 TMP_2 TMP_13
+n)))).
theorem minus_n_O:
\forall (n: nat).(eq nat n (minus n O))
\def
- \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).
+ \lambda (n: nat).(let TMP_2 \def (\lambda (n0: nat).(let TMP_1 \def (minus
+n0 O) in (eq nat n0 TMP_1))) in (let TMP_3 \def (refl_equal nat O) in (let
+TMP_5 \def (\lambda (n0: nat).(\lambda (_: (eq nat n0 (minus n0 O))).(let
+TMP_4 \def (S n0) in (refl_equal nat TMP_4)))) in (nat_ind TMP_2 TMP_3 TMP_5
+n)))).
theorem minus_n_n:
\forall (n: nat).(eq nat O (minus n n))
\def
- \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).
+ \lambda (n: nat).(let TMP_2 \def (\lambda (n0: nat).(let TMP_1 \def (minus
+n0 n0) in (eq nat O TMP_1))) in (let TMP_3 \def (refl_equal nat O) in (let
+TMP_4 \def (\lambda (n0: nat).(\lambda (IHn: (eq nat O (minus n0 n0))).IHn))
+in (nat_ind TMP_2 TMP_3 TMP_4 n)))).
theorem minus_Sn_m:
\forall (n: nat).(\forall (m: nat).((le m n) \to (eq nat (S (minus n m))
(minus (S n) m))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (Le: (le m n)).(le_elim_rel
-(\lambda (n0: nat).(\lambda (n1: nat).(eq nat (S (minus n1 n0)) (minus (S n1)
-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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (Le: (le m n)).(let TMP_5 \def
+(\lambda (n0: nat).(\lambda (n1: nat).(let TMP_1 \def (minus n1 n0) in (let
+TMP_2 \def (S TMP_1) in (let TMP_3 \def (S n1) in (let TMP_4 \def (minus
+TMP_3 n0) in (eq nat TMP_2 TMP_4))))))) in (let TMP_10 \def (\lambda (p:
+nat).(let TMP_6 \def (minus p O) in (let TMP_7 \def (minus p O) in (let TMP_8
+\def (minus_n_O p) in (let TMP_9 \def (sym_eq nat p TMP_7 TMP_8) in (f_equal
+nat nat S TMP_6 p TMP_9)))))) in (let TMP_11 \def (\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)))) in
+(le_elim_rel TMP_5 TMP_10 TMP_11 m n Le)))))).
theorem plus_minus:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).((eq nat n (plus m p))
\to (eq nat p (minus n m)))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(nat_double_ind
-(\lambda (n0: nat).(\lambda (n1: nat).((eq nat n1 (plus n0 p)) \to (eq nat p
-(minus n1 n0))))) (\lambda (n0: nat).(\lambda (H: (eq nat n0 p)).(eq_ind nat
-n0 (\lambda (n1: nat).(eq nat p n1)) (sym_eq nat n0 p H) (minus n0 O)
-(minus_n_O n0)))) (\lambda (n0: nat).(\lambda (H: (eq nat O (S (plus n0
-p)))).(False_ind (eq nat p O) (let H0 \def H in ((let H1 \def (O_S (plus n0
-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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(let TMP_2 \def
+(\lambda (n0: nat).(\lambda (n1: nat).((eq nat n1 (plus n0 p)) \to (let TMP_1
+\def (minus n1 n0) in (eq nat p TMP_1))))) in (let TMP_7 \def (\lambda (n0:
+nat).(\lambda (H: (eq nat n0 p)).(let TMP_3 \def (\lambda (n1: nat).(eq nat p
+n1)) in (let TMP_4 \def (sym_eq nat n0 p H) in (let TMP_5 \def (minus n0 O)
+in (let TMP_6 \def (minus_n_O n0) in (eq_ind nat n0 TMP_3 TMP_4 TMP_5
+TMP_6))))))) in (let TMP_12 \def (\lambda (n0: nat).(\lambda (H: (eq nat O (S
+(plus n0 p)))).(let TMP_8 \def (eq nat p O) in (let H0 \def H in (let TMP_9
+\def (plus n0 p) in (let H1 \def (O_S TMP_9) in (let TMP_10 \def (\lambda
+(H2: (eq nat O (S (plus n0 p)))).(H1 H2)) in (let TMP_11 \def (TMP_10 H0) in
+(False_ind TMP_8 TMP_11))))))))) in (let TMP_15 \def (\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)))).(let TMP_13
+\def (plus n0 p) in (let TMP_14 \def (eq_add_S m0 TMP_13 H0) in (H
+TMP_14))))))) in (nat_double_ind TMP_2 TMP_7 TMP_12 TMP_15 m n))))))).
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))))).
+ \lambda (n: nat).(\lambda (m: nat).(let TMP_1 \def (plus n m) in (let TMP_2
+\def (minus TMP_1 n) in (let TMP_3 \def (plus n m) in (let TMP_4 \def (plus n
+m) in (let TMP_5 \def (refl_equal nat TMP_4) in (let TMP_6 \def (plus_minus
+TMP_3 n m TMP_5) in (sym_eq nat m TMP_2 TMP_6)))))))).
theorem le_pred_n:
\forall (n: nat).(le (pred n) n)
\def
- \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).
+ \lambda (n: nat).(let TMP_2 \def (\lambda (n0: nat).(let TMP_1 \def (pred
+n0) in (le TMP_1 n0))) in (let TMP_3 \def (le_n O) in (let TMP_7 \def
+(\lambda (n0: nat).(\lambda (_: (le (pred n0) n0)).(let TMP_4 \def (S n0) in
+(let TMP_5 \def (pred TMP_4) in (let TMP_6 \def (le_n n0) in (le_S TMP_5 n0
+TMP_6)))))) in (nat_ind TMP_2 TMP_3 TMP_7 n)))).
theorem le_plus_l:
\forall (n: nat).(\forall (m: nat).(le n (plus n m)))
\def
- \lambda (n: nat).(nat_ind (\lambda (n0: nat).(\forall (m: nat).(le n0 (plus
-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).
+ \lambda (n: nat).(let TMP_2 \def (\lambda (n0: nat).(\forall (m: nat).(let
+TMP_1 \def (plus n0 m) in (le n0 TMP_1)))) in (let TMP_3 \def (\lambda (m:
+nat).(le_O_n m)) in (let TMP_6 \def (\lambda (n0: nat).(\lambda (IHn:
+((\forall (m: nat).(le n0 (plus n0 m))))).(\lambda (m: nat).(let TMP_4 \def
+(plus n0 m) in (let TMP_5 \def (IHn m) in (le_n_S n0 TMP_4 TMP_5)))))) in
+(nat_ind TMP_2 TMP_3 TMP_6 n)))).
theorem le_plus_r:
\forall (n: nat).(\forall (m: nat).(le m (plus n m)))
\def
- \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)).
+ \lambda (n: nat).(\lambda (m: nat).(let TMP_2 \def (\lambda (n0: nat).(let
+TMP_1 \def (plus n0 m) in (le m TMP_1))) in (let TMP_3 \def (le_n m) in (let
+TMP_5 \def (\lambda (n0: nat).(\lambda (H: (le m (plus n0 m))).(let TMP_4
+\def (plus n0 m) in (le_S m TMP_4 H)))) in (nat_ind TMP_2 TMP_3 TMP_5 n))))).
theorem simpl_le_plus_l:
\forall (p: nat).(\forall (n: nat).(\forall (m: nat).((le (plus p n) (plus p
m)) \to (le n m))))
\def
- \lambda (p: nat).(nat_ind (\lambda (n: nat).(\forall (n0: nat).(\forall (m:
-nat).((le (plus n n0) (plus n m)) \to (le n0 m))))) (\lambda (n:
-nat).(\lambda (m: nat).(\lambda (H: (le n m)).H))) (\lambda (p0:
-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).
+ \lambda (p: nat).(let TMP_1 \def (\lambda (n: nat).(\forall (n0:
+nat).(\forall (m: nat).((le (plus n n0) (plus n m)) \to (le n0 m))))) in (let
+TMP_2 \def (\lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).H))) in
+(let TMP_6 \def (\lambda (p0: 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)))).(let TMP_3 \def (plus p0 n) in (let TMP_4 \def (plus p0 m) in (let
+TMP_5 \def (le_S_n TMP_3 TMP_4 H) in (IHp n m TMP_5))))))))) in (nat_ind
+TMP_1 TMP_2 TMP_6 p)))).
theorem le_plus_trans:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).((le n m) \to (le n
(plus m p)))))
\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))))).
+m)).(let TMP_1 \def (plus m p) in (let TMP_2 \def (le_plus_l m p) in
+(le_trans n m TMP_1 H TMP_2)))))).
theorem le_reg_l:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).((le n m) \to (le (plus
p n) (plus p m)))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(nat_ind (\lambda (n0:
-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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(let TMP_3 \def
+(\lambda (n0: nat).((le n m) \to (let TMP_1 \def (plus n0 n) in (let TMP_2
+\def (plus n0 m) in (le TMP_1 TMP_2))))) in (let TMP_4 \def (\lambda (H: (le
+n m)).H) in (let TMP_8 \def (\lambda (p0: nat).(\lambda (IHp: (((le n m) \to
+(le (plus p0 n) (plus p0 m))))).(\lambda (H: (le n m)).(let TMP_5 \def (plus
+p0 n) in (let TMP_6 \def (plus p0 m) in (let TMP_7 \def (IHp H) in (le_n_S
+TMP_5 TMP_6 TMP_7))))))) in (nat_ind TMP_3 TMP_4 TMP_8 p)))))).
theorem le_plus_plus:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).(\forall (q: nat).((le
n m) \to ((le p q) \to (le (plus n p) (plus m q)))))))
\def
\lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (q:
-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)))))).
+nat).(\lambda (H: (le n m)).(\lambda (H0: (le p q)).(let TMP_3 \def (\lambda
+(n0: nat).(let TMP_1 \def (plus n p) in (let TMP_2 \def (plus n0 q) in (le
+TMP_1 TMP_2)))) in (let TMP_4 \def (le_reg_l p q n H0) in (let TMP_7 \def
+(\lambda (m0: nat).(\lambda (_: (le n m0)).(\lambda (H2: (le (plus n p) (plus
+m0 q))).(let TMP_5 \def (plus n p) in (let TMP_6 \def (plus m0 q) in (le_S
+TMP_5 TMP_6 H2)))))) in (le_ind n TMP_3 TMP_4 TMP_7 m H))))))))).
theorem le_plus_minus:
\forall (n: nat).(\forall (m: nat).((le n m) \to (eq nat m (plus n (minus m
n)))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (Le: (le n m)).(le_elim_rel
-(\lambda (n0: nat).(\lambda (n1: nat).(eq nat n1 (plus n0 (minus n1 n0)))))
-(\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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (Le: (le n m)).(let TMP_3 \def
+(\lambda (n0: nat).(\lambda (n1: nat).(let TMP_1 \def (minus n1 n0) in (let
+TMP_2 \def (plus n0 TMP_1) in (eq nat n1 TMP_2))))) in (let TMP_4 \def
+(\lambda (p: nat).(minus_n_O p)) in (let TMP_7 \def (\lambda (p:
+nat).(\lambda (q: nat).(\lambda (_: (le p q)).(\lambda (H0: (eq nat q (plus p
+(minus q p)))).(let TMP_5 \def (minus q p) in (let TMP_6 \def (plus p TMP_5)
+in (f_equal nat nat S q TMP_6 H0))))))) in (le_elim_rel TMP_3 TMP_4 TMP_7 n m
+Le)))))).
theorem le_plus_minus_r:
\forall (n: nat).(\forall (m: nat).((le n m) \to (eq nat (plus n (minus m
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)))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (H: (le n m)).(let TMP_1 \def
+(minus m n) in (let TMP_2 \def (plus n TMP_1) in (let TMP_3 \def
+(le_plus_minus n m H) in (sym_eq nat m TMP_2 TMP_3)))))).
theorem simpl_lt_plus_l:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).((lt (plus p n) (plus p
m)) \to (lt n m))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(nat_ind (\lambda (n0:
-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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(let TMP_1 \def
+(\lambda (n0: nat).((lt (plus n0 n) (plus n0 m)) \to (lt n m))) in (let TMP_2
+\def (\lambda (H: (lt n m)).H) in (let TMP_7 \def (\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)))).(let TMP_3 \def (plus p0 n) in (let TMP_4 \def
+(S TMP_3) in (let TMP_5 \def (plus p0 m) in (let TMP_6 \def (le_S_n TMP_4
+TMP_5 H) in (IHp TMP_6)))))))) in (nat_ind TMP_1 TMP_2 TMP_7 p)))))).
theorem lt_reg_l:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).((lt n m) \to (lt (plus
p n) (plus p m)))))
\def
- \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(nat_ind (\lambda (n0:
-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))).
+ \lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(let TMP_3 \def
+(\lambda (n0: nat).((lt n m) \to (let TMP_1 \def (plus n0 n) in (let TMP_2
+\def (plus n0 m) in (lt TMP_1 TMP_2))))) in (let TMP_4 \def (\lambda (H: (lt
+n m)).H) in (let TMP_8 \def (\lambda (p0: nat).(\lambda (IHp: (((lt n m) \to
+(lt (plus p0 n) (plus p0 m))))).(\lambda (H: (lt n m)).(let TMP_5 \def (plus
+p0 n) in (let TMP_6 \def (plus p0 m) in (let TMP_7 \def (IHp H) in (lt_n_S
+TMP_5 TMP_6 TMP_7))))))) in (nat_ind TMP_3 TMP_4 TMP_8 p)))))).
theorem lt_reg_r:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).((lt n m) \to (lt (plus
n p) (plus m p)))))
\def
\lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (H: (lt n
-m)).(eq_ind_r nat (plus p n) (\lambda (n0: nat).(lt n0 (plus m p))) (eq_ind_r
-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))))).
+m)).(let TMP_1 \def (plus p n) in (let TMP_3 \def (\lambda (n0: nat).(let
+TMP_2 \def (plus m p) in (lt n0 TMP_2))) in (let TMP_4 \def (plus p m) in
+(let TMP_6 \def (\lambda (n0: nat).(let TMP_5 \def (plus p n) in (lt TMP_5
+n0))) in (let TMP_9 \def (\lambda (n0: nat).(let TMP_7 \def (plus n0 n) in
+(let TMP_8 \def (plus n0 m) in (lt TMP_7 TMP_8)))) in (let TMP_11 \def
+(\lambda (n0: nat).(\lambda (_: (lt (plus n0 n) (plus n0 m))).(let TMP_10
+\def (S n0) in (lt_reg_l n m TMP_10 H)))) in (let TMP_12 \def (nat_ind TMP_9
+H TMP_11 p) in (let TMP_13 \def (plus m p) in (let TMP_14 \def (plus_sym m p)
+in (let TMP_15 \def (eq_ind_r nat TMP_4 TMP_6 TMP_12 TMP_13 TMP_14) in (let
+TMP_16 \def (plus n p) in (let TMP_17 \def (plus_sym n p) in (eq_ind_r nat
+TMP_1 TMP_3 TMP_15 TMP_16 TMP_17)))))))))))))))).
theorem le_lt_plus_plus:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).(\forall (q: nat).((le
n m) \to ((lt p q) \to (lt (plus n p) (plus m q)))))))
\def
\lambda (n: nat).(\lambda (m: nat).(\lambda (p: nat).(\lambda (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))))))).
+nat).(\lambda (H: (le n m)).(\lambda (H0: (le (S p) q)).(let TMP_1 \def (S p)
+in (let TMP_2 \def (plus n TMP_1) in (let TMP_4 \def (\lambda (n0: nat).(let
+TMP_3 \def (plus m q) in (le n0 TMP_3))) in (let TMP_5 \def (S p) in (let
+TMP_6 \def (le_plus_plus n m TMP_5 q H H0) in (let TMP_7 \def (S n) in (let
+TMP_8 \def (plus TMP_7 p) in (let TMP_9 \def (plus_Snm_nSm n p) in (eq_ind_r
+nat TMP_2 TMP_4 TMP_6 TMP_8 TMP_9)))))))))))))).
theorem lt_le_plus_plus:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).(\forall (q: nat).((lt
n m) \to ((le p q) \to (lt (plus n p) (plus m q)))))))
\def
\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)))))).
+nat).(\lambda (H: (le (S n) m)).(\lambda (H0: (le p q)).(let TMP_1 \def (S n)
+in (le_plus_plus TMP_1 m p q H H0))))))).
theorem lt_plus_plus:
\forall (n: nat).(\forall (m: nat).(\forall (p: nat).(\forall (q: nat).((lt
n m) \to ((lt p q) \to (lt (plus n p) (plus m q)))))))
\def
\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))))))).
+nat).(\lambda (H: (lt n m)).(\lambda (H0: (lt p q)).(let TMP_1 \def
+(lt_le_weak p q H0) in (lt_le_plus_plus n m p q H TMP_1))))))).
theorem well_founded_ltof:
\forall (A: Type[0]).(\forall (f: ((A \to nat))).(well_founded A (ltof A f)))
\def
\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:
-(lt (f a) O)).(H1 H2))) H0))))) (\lambda (n0: nat).(\lambda (IHn: ((\forall
-(a: A).((lt (f a) n0) \to (Acc A (ltof A f) a))))).(\lambda (a: A).(\lambda
-(ltSma: (lt (f a) (S n0))).(Acc_intro A (ltof A f) a (\lambda (b: A).(\lambda
-(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))))))).
+nat).(let TMP_2 \def (\lambda (n0: nat).(\forall (a: A).((lt (f a) n0) \to
+(let TMP_1 \def (ltof A f) in (Acc A TMP_1 a))))) in (let TMP_8 \def (\lambda
+(a: A).(\lambda (H: (lt (f a) O)).(let TMP_3 \def (ltof A f) in (let TMP_4
+\def (Acc A TMP_3 a) in (let H0 \def H in (let TMP_5 \def (f a) in (let H1
+\def (lt_n_O TMP_5) in (let TMP_6 \def (\lambda (H2: (lt (f a) O)).(H1 H2))
+in (let TMP_7 \def (TMP_6 H0) in (False_ind TMP_4 TMP_7)))))))))) in (let
+TMP_16 \def (\lambda (n0: nat).(\lambda (IHn: ((\forall (a: A).((lt (f a) n0)
+\to (Acc A (ltof A f) a))))).(\lambda (a: A).(\lambda (ltSma: (lt (f a) (S
+n0))).(let TMP_9 \def (ltof A f) in (let TMP_15 \def (\lambda (b: A).(\lambda
+(ltfafb: (lt (f b) (f a))).(let TMP_10 \def (f b) in (let TMP_11 \def (f a)
+in (let TMP_12 \def (f a) in (let TMP_13 \def (lt_n_Sm_le TMP_12 n0 ltSma) in
+(let TMP_14 \def (lt_le_trans TMP_10 TMP_11 n0 ltfafb TMP_13) in (IHn b
+TMP_14)))))))) in (Acc_intro A TMP_9 a TMP_15))))))) in (nat_ind TMP_2 TMP_8
+TMP_16 n))))) in (\lambda (a: A).(let TMP_17 \def (f a) in (let TMP_18 \def
+(S TMP_17) in (let TMP_19 \def (f a) in (let TMP_20 \def (S TMP_19) in (let
+TMP_21 \def (le_n TMP_20) in (H TMP_18 a TMP_21))))))))).
theorem lt_wf:
well_founded nat lt
\def
- well_founded_ltof nat (\lambda (m: nat).m).
+ let TMP_1 \def (\lambda (m: nat).m) in (well_founded_ltof nat TMP_1).
theorem lt_wf_ind:
\forall (p: nat).(\forall (P: ((nat \to Prop))).(((\forall (n:
nat).(((\forall (m: nat).((lt m n) \to (P m)))) \to (P n)))) \to (P p)))
\def
\lambda (p: nat).(\lambda (P: ((nat \to Prop))).(\lambda (H: ((\forall (n:
-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)))).
+nat).(((\forall (m: nat).((lt m n) \to (P m)))) \to (P n))))).(let TMP_1 \def
+(\lambda (n: nat).(P n)) in (let TMP_2 \def (\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)))) in (let TMP_3 \def (lt_wf p) in
+(Acc_ind nat lt TMP_1 TMP_2 p TMP_3)))))).
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