(* *)
(**************************************************************************)
-include "ground_2/notation/constructors/nil_0.ma".
-include "ground_2/notation/constructors/cons_2.ma".
-include "ground_2/lib/arith.ma".
+include "ground_2/notation/constructors/circledE_1.ma".
+include "ground_2/notation/constructors/oplusright_3.ma".
+include "ground_2/lib/relations.ma".
(* LISTS ********************************************************************)
| nil : list A
| cons: A → list A → list A.
-interpretation "nil (list)" 'Nil = (nil ?).
+interpretation "nil (list)" 'CircledE A = (nil A).
-interpretation "cons (list)" 'Cons hd tl = (cons ? hd tl).
-
-rec definition length (A:Type[0]) (l:list A) on l ≝ match l with
-[ nil ⇒ 0
-| cons _ l ⇒ ⫯(length A l)
-].
-
-interpretation "length (list)"
- 'card l = (length ? l).
+interpretation "cons (list)" 'OPlusRight A hd tl = (cons A hd tl).
rec definition all A (R:predicate A) (l:list A) on l ≝
match l with
[ nil ⇒ ⊤
- | cons hd tl ⇒ R hd ∧ all A R tl
+ | cons hd tl ⇒ ∧∧ R hd & all A R tl
].
-
-(* Basic properties on length ***********************************************)
-
-lemma length_nil (A:Type[0]): |nil A| = 0.
-// qed.
-
-lemma length_cons (A:Type[0]) (l:list A) (a:A): |a@l| = ⫯|l|.
-// qed.
-
-(* Basic inversion lemmas on length *****************************************)
-
-lemma length_inv_zero_dx (A:Type[0]) (l:list A): |l| = 0 → l = ◊.
-#A * // #a #l >length_cons #H destruct
-qed-.
-
-lemma length_inv_zero_sn (A:Type[0]) (l:list A): 0 = |l| → l = ◊.
-/2 width=1 by length_inv_zero_dx/ qed-.
-
-lemma length_inv_succ_dx (A:Type[0]) (l:list A) (x): |l| = ⫯x →
- ∃∃tl,a. x = |tl| & l = a @ tl.
-#A * /2 width=4 by ex2_2_intro/
->length_nil #x #H destruct
-qed-.
-
-lemma length_inv_succ_sn (A:Type[0]) (l:list A) (x): ⫯x = |l| →
- ∃∃tl,a. x = |tl| & l = a @ tl.
-/2 width=1 by length_inv_succ_dx/ qed.