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Merge pull request #34 from samuelgruetter/ltac_lecture
preparing Ltac lecture
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49af9ea6a9
3 changed files with 21 additions and 2 deletions
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@ -483,6 +483,25 @@ Goal False.
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length (1 :: 2 :: 3 :: nil) ltac:(fun n => pose n).
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length (1 :: 2 :: 3 :: nil) ltac:(fun n => pose n).
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Abort.
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Abort.
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(* However, it's not always convenient to use continuation passing style
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* everywhere, so cool kids use the following hack to sneak side effects
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* into otherwise functional Ltac code: *)
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Module Import WithPrintingFixedWithoutContinuations.
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Ltac length ls :=
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let __ := match constr:(Set) with
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| _ => (* put all your side effects here:*)
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idtac ls; assert (ls = ls) by equality
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end in
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match ls with
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| nil => constr:(O)
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| _ :: ?ls' => let L := length ls' in constr:(S L)
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end.
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End WithPrintingFixedWithoutContinuations.
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Goal False.
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let n := length (1 :: 2 :: 3 :: nil) in
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pose n.
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Abort.
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(** * Recursive Proof Search *)
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(** * Recursive Proof Search *)
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@ -182,7 +182,7 @@ Section propositional.
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Admitted.
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Admitted.
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End propositional.
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End propositional.
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(* Backrtracking example #1 *)
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(* Backtracking example #1 *)
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Theorem m1 : True.
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Theorem m1 : True.
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Proof.
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Proof.
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@ -29,7 +29,7 @@ Inductive fact_state :=
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* throughout recursive invocations of a predicate (though this definition does
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* throughout recursive invocations of a predicate (though this definition does
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* not use recursion). After the colon, we give a type that expresses which
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* not use recursion). After the colon, we give a type that expresses which
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* additional arguments exist, followed by [Prop] for "proposition."
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* additional arguments exist, followed by [Prop] for "proposition."
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* Putting this inductive definition in [Prop] is what marks at as a predicate.
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* Putting this inductive definition in [Prop] is what marks it as a predicate.
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* Our prior definitions have implicitly been in [Set], the normal universe
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* Our prior definitions have implicitly been in [Set], the normal universe
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* of mathematical objects. *)
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* of mathematical objects. *)
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Inductive fact_init (original_input : nat) : fact_state -> Prop :=
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Inductive fact_init (original_input : nat) : fact_state -> Prop :=
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