Mercurial > cpdt > repo
diff src/InductiveTypes.v @ 29:add8215ec72a
nat lists and trees
author | Adam Chlipala <adamc@hcoop.net> |
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date | Mon, 08 Sep 2008 15:23:04 -0400 |
parents | 0543bbd62843 |
children | 4887ddb1ad23 |
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--- a/src/InductiveTypes.v Mon Sep 08 15:02:18 2008 -0400 +++ b/src/InductiveTypes.v Mon Sep 08 15:23:04 2008 -0400 @@ -275,4 +275,85 @@ (** [injection] refers to a premise by number, adding new equalities between the corresponding arguments of equated terms that are formed with the same constructor. We end up needing to prove [n = m -> n = m], so it is unsurprising that a tactic named [trivial] is able to finish the proof. -There is also a very useful tactic called [congruence] that can prove this theorem immediately. [congruence] generalizes [discriminate] and [injection], and it also adds reasoning about the general properties of equality, such as that a function returns equal results on equal arguments. That is, [congruence] is a %\textit{%#<i>#complete decision procedure for the theory of equality and uninterpreted functions#</i>#%}%, plus some smarts about inductive types. *) \ No newline at end of file +There is also a very useful tactic called [congruence] that can prove this theorem immediately. [congruence] generalizes [discriminate] and [injection], and it also adds reasoning about the general properties of equality, such as that a function returns equal results on equal arguments. That is, [congruence] is a %\textit{%#<i>#complete decision procedure for the theory of equality and uninterpreted functions#</i>#%}%, plus some smarts about inductive types. + +%\medskip% + +We can define a type of lists of natural numbers. *) + +Inductive nat_list : Set := +| NNil : nat_list +| NCons : nat -> nat_list -> nat_list. + +(** Recursive definitions are straightforward extensions of what we have seen before. *) + +Fixpoint nlength (ls : nat_list) : nat := + match ls with + | NNil => O + | NCons _ ls' => S (nlength ls') + end. + +Fixpoint napp (ls1 ls2 : nat_list) {struct ls1} : nat_list := + match ls1 with + | NNil => ls2 + | NCons n ls1' => NCons n (napp ls1' ls2) + end. + +(** Inductive theorem proving can again be automated quite effectively. *) + +Theorem nlength_napp : forall ls1 ls2 : nat_list, nlength (napp ls1 ls2) + = plus (nlength ls1) (nlength ls2). + induction ls1; crush. +Qed. + +Check nat_list_ind. +(** [[ + +nat_list_ind + : forall P : nat_list -> Prop, + P NNil -> + (forall (n : nat) (n0 : nat_list), P n0 -> P (NCons n n0)) -> + forall n : nat_list, P n +]] + +%\medskip% + +In general, we can implement any "tree" types as inductive types. For example, here are binary trees of naturals. *) + +Inductive nat_btree : Set := +| NLeaf : nat_btree +| NNode : nat_btree -> nat -> nat_btree -> nat_btree. + +Fixpoint nsize (tr : nat_btree) : nat := + match tr with + | NLeaf => O + | NNode tr1 _ tr2 => plus (nsize tr1) (nsize tr2) + end. + +Fixpoint nsplice (tr1 tr2 : nat_btree) {struct tr1} : nat_btree := + match tr1 with + | NLeaf => tr2 + | NNode tr1' n tr2' => NNode (nsplice tr1' tr2) n tr2' + end. + +Theorem plus_assoc : forall n1 n2 n3 : nat, plus (plus n1 n2) n3 = plus n1 (plus n2 n3). + induction n1; crush. +Qed. + +Theorem nsize_nsplice : forall tr1 tr2 : nat_btree, nsize (nsplice tr1 tr2) + = plus (nsize tr2) (nsize tr1). + Hint Rewrite n_plus_O plus_assoc : cpdt. + + induction tr1; crush. +Qed. + +Check nat_btree_ind. +(** [[ + +nat_btree_ind + : forall P : nat_btree -> Prop, + P NLeaf -> + (forall n : nat_btree, + P n -> forall (n0 : nat) (n1 : nat_btree), P n1 -> P (NNode n n0 n1)) -> + forall n : nat_btree, P n +]] *)