(* *)
(**************************************************************************)
-include "lambda/types.ma".
+include "lambda/subst.ma".
+include "basics/list.ma".
+include "lambda/lambda_notation.ma".
(* MATTER CONCERNING STRONG NORMALIZATION TO BE PUT ELSEWHERE *****************)
-(* from sn.ma *****************************************************************)
+(* arithmetics ****************************************************************)
-(* all(P,l) holds when P holds for all members of l *)
-let rec all (P:T→Prop) l on l ≝ match l with
- [ nil ⇒ True
- | cons A D ⇒ P A ∧ all P D
+lemma arith1: ∀x,y. (S x) ≰ (S y) → x ≰ y.
+#x #y #HS @nmk (elim HS) -HS /3/
+qed.
+
+lemma arith2: ∀i,p,k. k ≤ i → i + p - (k + p) = i - k.
+#i #p #k #H @plus_to_minus
+>commutative_plus >(commutative_plus k) >associative_plus @eq_f /2/
+qed.
+
+lemma arith3: ∀x,y,z. x ≰ y → x + z ≰ y + z.
+#x #y #z #H @nmk (elim H) -H /3/
+qed.
+
+lemma arith4: ∀x,y. S x ≰ y → x≠y → y < x.
+#x #y #H1 #H2 lapply (not_le_to_lt … H1) -H1 #H1 @not_eq_to_le_to_lt /2/
+qed.
+
+lemma arith5: ∀x,y. x < y → S (y - 1) ≰ x.
+#x #y #H @lt_to_not_le <minus_Sn_m /2/
+qed.
+
+(* lists **********************************************************************)
+
+lemma length_append: ∀A. ∀(l2,l1:list A). |l1@l2| = |l1| + |l2|.
+#A #l2 #l1 elim l1 -l1; normalize //
+qed.
+
+(* all(?,P,l) holds when P holds for all members of l *)
+let rec all (A:Type[0]) (P:A→Prop) l on l ≝ match l with
+ [ nil ⇒ True
+ | cons hd tl ⇒ P hd ∧ all A P tl
].
-(* all(?,P,l1,l2) holds when P holds for all paired members of l1 and l2 *)
-let rec all2 (A:Type[0]) (P:A→A→Prop) l1 l2 on l1 ≝ match l1 with
+lemma all_hd: ∀A:Type[0]. ∀P:A→Prop. ∀a. P a → ∀l. all … P l → P (hd … l a).
+#A #P #a #Ha #l elim l -l [ #_ @Ha | #b #l #_ #Hl elim Hl -Hl // ]
+qed.
+
+lemma all_tl: ∀A:Type[0]. ∀P:A→Prop. ∀l. all … P l → all … P (tail … l).
+#A #P #l elim l -l // #b #l #IH #Hl elim Hl -Hl //
+qed.
+
+lemma all_nth: ∀A:Type[0]. ∀P:A→Prop. ∀a. P a → ∀i,l. all … P l → P (nth i … l a).
+#A #P #a #Ha #i elim i -i [ @all_hd // | #i #IH #l #Hl @IH /2/ ]
+qed.
+
+lemma all_append: ∀A,P,l2,l1. all A P l1 → all A P l2 → all A P (l1 @ l2).
+#A #P #l2 #l1 elim l1 -l1; normalize // #hd #tl #IH1 #H elim H -H /3/
+qed.
+
+(* all2(?,P,l1,l2) holds when P holds for all paired members of l1 and l2 *)
+let rec all2 (A,B:Type[0]) (P:A→B→Prop) l1 l2 on l1 ≝ match l1 with
[ nil ⇒ l2 = nil ?
| cons hd1 tl1 ⇒ match l2 with
[ nil ⇒ False
- | cons hd2 tl2 ⇒ P hd1 hd2 ∧ all2 A P tl1 tl2
+ | cons hd2 tl2 ⇒ P hd1 hd2 ∧ all2 A B P tl1 tl2
]
].
+lemma all2_length: ∀A,B:Type[0]. ∀P:A→B→Prop.
+ ∀l1,l2. all2 … P l1 l2 → |l1|=|l2|.
+#A #B #P #l1 elim l1 -l1 [ #l2 #H >H // ]
+#x1 #l1 #IH1 #l2 elim l2 -l2 [ #false elim false ]
+#x2 #l2 #_ #H elim H -H; normalize /3/
+qed.
+
+lemma all2_hd: ∀A,B:Type[0]. ∀P:A→B→Prop. ∀a,b. P a b →
+ ∀l1,l2. all2 … P l1 l2 → P (hd … l1 a) (hd … l2 b).
+#A #B #P #a #b #Hab #l1 elim l1 -l1 [ #l2 #H2 >H2 @Hab ]
+#x1 #l1 #_ #l2 elim l2 -l2 [ #false elim false ]
+#x2 #l2 #_ #H elim H -H //
+qed.
+
+lemma all2_tl: ∀A,B:Type[0]. ∀P:A→B→Prop.
+ ∀l1,l2. all2 … P l1 l2 → all2 … P (tail … l1) (tail … l2).
+#A #B #P #l1 elim l1 -l1 [ #l2 #H >H // ]
+#x1 #l1 #_ #l2 elim l2 -l2 [ #false elim false ]
+#x2 #l2 #_ #H elim H -H //
+qed.
+
+lemma all2_nth: ∀A,B:Type[0]. ∀P:A→B→Prop. ∀a,b. P a b →
+ ∀i,l1,l2. all2 … P l1 l2 → P (nth i … l1 a) (nth i … l2 b).
+#A #B #P #a #b #Hab #i elim i -i [ @all2_hd // | #i #IH #l1 #l2 #H @IH /2/ ]
+qed.
+
+lemma all2_append: ∀A,B,P,l2,m2. all2 A B P l2 m2 →
+ ∀l1,m1. all2 A B P l1 m1 → all2 A B P (l1 @ l2) (m1 @ m2).
+#A #B #P #l2 #m2 #H2 #l1 (elim l1) -l1 [ #m1 #H >H @H2 ]
+#x1 #l1 #IH1 #m2 elim m2 -m2 [ #false elim false ]
+#x2 #m2 #_ #H elim H -H /3/
+qed.
+
+lemma all2_symmetric: ∀A. ∀P:A→A→Prop. symmetric … P → symmetric … (all2 … P).
+#A #P #HP #l1 elim l1 -l1 [ #l2 #H >H // ]
+#x1 #l1 #IH1 #l2 elim l2 -l2 [ #false elim false ]
+#x2 #l2 #_ #H elim H -H /3/
+qed.
+
+(* terms **********************************************************************)
+
(* Appl F l generalizes App applying F to a list of arguments
* The head of l is applied first
*)
| cons A D ⇒ Appl (App F A) D
].
+lemma appl_append: ∀N,l,M. Appl M (l @ [N]) = App (Appl M l) N.
+#N #l elim l -l // #hd #tl #IHl #M >IHl //
+qed.
+
+(* FG: not needed for now
+(* nautral terms *)
+inductive neutral: T → Prop ≝
+ | neutral_sort: ∀n.neutral (Sort n)
+ | neutral_rel: ∀i.neutral (Rel i)
+ | neutral_app: ∀M,N.neutral (App M N)
+.
+*)
+
+(* substitution ***************************************************************)
+
(* FG: do we need this?
definition lift0 ≝ λp,k,M . lift M p k. (**) (* remove definition *)
-theorem lift_appl: ∀p,k,l,F. lift (Appl F l) p k =
+lemma lift_appl: ∀p,k,l,F. lift (Appl F l) p k =
Appl (lift F p k) (map … (lift0 p k) l).
#p #k #l (elim l) -l /2/ #A #D #IHl #F >IHl //
qed.
*)
-(* from rc.ma *****************************************************************)
-
-theorem arith1: ∀x,y. (S x) ≰ (S y) → x ≰ y.
-#x #y #HS @nmk (elim HS) -HS /3/
-qed.
-
-theorem arith2: ∀i,p,k. k ≤ i → i + p - (k + p) = i - k.
-#i #p #k #H @plus_to_minus
->commutative_plus >(commutative_plus k) >associative_plus @eq_f /2/
+lemma lift_rel_lt: ∀i,p,k. (S i) ≤ k → lift (Rel i) k p = Rel i.
+#i #p #k #Hik normalize >(le_to_leb_true … Hik) //
qed.
-theorem arith3: ∀x,y,z. x ≰ y → x + z ≰ y + z.
-#x #y #z #H @nmk (elim H) -H /3/
+lemma lift_rel_ge: ∀i,p,k. (S i) ≰ k → lift (Rel i) k p = Rel (i+p).
+#i #p #k #Hik normalize >(lt_to_leb_false (S i) k) /2/
qed.
-theorem length_append: ∀A. ∀(l2,l1:list A). |l1@l2| = |l1| + |l2|.
-#A #l2 #l1 (elim l1) -l1 (normalize) //
-qed.
+lemma lift_app: ∀M,N,k,p.
+ lift (App M N) k p = App (lift M k p) (lift N k p).
+// qed.
-theorem lift_rel_lt: ∀i,p,k. (S i) ≤ k → lift (Rel i) k p = Rel i.
-#i #p #k #Hik normalize >(le_to_leb_true … Hik) //
-qed.
+lemma lift_lambda: ∀N,M,k,p. lift (Lambda N M) k p =
+ Lambda (lift N k p) (lift M (k + 1) p).
+// qed.
-theorem lift_rel_ge: ∀i,p,k. (S i) ≰ k → lift (Rel i) k p = Rel (i+p).
-#i #p #k #Hik normalize >(lt_to_leb_false (S i) k) /2/
-qed.
+lemma lift_prod: ∀N,M,k,p.
+ lift (Prod N M) k p = Prod (lift N k p) (lift M (k + 1) p).
+// qed.
-theorem lift_app: ∀M,N,k,p.
- lift (App M N) k p = App (lift M k p) (lift N k p).
+lemma subst_app: ∀M,N,k,L. (App M N)[k≝L] = App M[k≝L] N[k≝L].
// qed.
-theorem lift_lambda: ∀N,M,k,p. lift (Lambda N M) k p =
- Lambda (lift N k p) (lift M (k + 1) p).
+lemma subst_lambda: ∀N,M,k,L. (Lambda N M)[k≝L] = Lambda N[k≝L] M[k+1≝L].
// qed.
-theorem lift_prod: ∀N,M,k,p.
- lift (Prod N M) k p = Prod (lift N k p) (lift M (k + 1) p).
+lemma subst_prod: ∀N,M,k,L. (Prod N M)[k≝L] = Prod N[k≝L] M[k+1≝L].
// qed.
-(* telescopic non-delifting substitution of l in M.
- * [this is the telescoping delifting substitution lifted by |l|]
+
+axiom lift_subst_lt: ∀A,B,i,j,k. lift (B[j≝A]) (j+k) i =
+ (lift B (j+k+1) i)[j≝lift A k i].
+
+(* telescopic delifting substitution of l in M.
* Rel 0 is replaced with the head of l
*)
-let rec substc M l on l ≝ match l with
- [ nil ⇒ M
- | cons A D ⇒ (lift (substc M[0≝A] D) 0 1)
+let rec tsubst M l on l ≝ match l with
+ [ nil ⇒ M
+ | cons A D ⇒ (tsubst M[0≝A] D)
].
-notation "M [ l ]" non associative with precedence 90 for @{'Substc $M $l}.
-
-interpretation "Substc" 'Substc M l = (substc M l).
-
-(* this is just to test that substitution works as expected
-theorem test1: ∀A,B,C. (App (App (Rel 0) (Rel 1)) (Rel 2))[A::B::C::nil ?] =
- App (App (lift A 0 1) (lift B 0 2)) (lift C 0 3).
-#A #B #C normalize
->lift_0 >lift_0 >lift_0
->lift_lift1>lift_lift1>lift_lift1>lift_lift1>lift_lift1>lift_lift1
-normalize
-qed.
-*)
+interpretation "telescopic substitution" 'Subst1 M l = (tsubst M l).
-theorem substc_refl: ∀l,t. (lift t 0 (|l|))[l] = (lift t 0 (|l|)).
-#l (elim l) -l (normalize) // #A #D #IHl #t cut (S (|D|) = |D| + 1) // (**) (* eliminate cut *)
+lemma tsubst_refl: ∀l,t. (lift t 0 (|l|))[l] = t.
+#l elim l -l; normalize // #hd #tl #IHl #t cut (S (|tl|) = |tl| + 1) // (**) (* eliminate cut *)
qed.
-theorem substc_sort: ∀n,l. (Sort n)[l] = Sort n.
-//
-qed.
-(* FG: not needed for now
-(* nautral terms *)
-inductive neutral: T → Prop ≝
- | neutral_sort: ∀n.neutral (Sort n)
- | neutral_rel: ∀i.neutral (Rel i)
- | neutral_app: ∀M,N.neutral (App M N)
-.
-*)
+lemma tsubst_sort: ∀n,l. (Sort n)[l] = Sort n.
+// qed.