# Tagged Questions

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### Coq - induction on lists with a function applied to each element

Am trying to prove that applying a function f to every element of two lists results similar rel_list lists if they were originaly related. I have a rel on the elements of the list and have proved a ...
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### Coq - Induction over functions without losing information

I'm having some troubles in Coq when trying to perform case analysis on the result of a function (which returns an inductive type). When using the usual tactics, like elim, induction, destroy, etc, ...
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### How to get an induction principle for nested fix

I am working with a function that searches through a range of values. Require Import List. (* Implementation of ListTest omitted. *) Definition ListTest (l : list nat) := false. Definition ...
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### Double induction in Coq

Basically, I would like to prove that following result: Lemma nat_ind_2 (P: nat -> Prop): P 0 -> P 1 -> (forall n, P n -> P (2+n)) -> forall n, P n. that is the recurrence scheme ...
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### General recursion and induction in Coq

Let's suppose that I have type T wellfounded relation R: T->T->Prop function F1: T->T that makes argument "smaller" condition C: T->Prop that describes "start values" of R function F2: T->T that ...
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### Why must coq mutually inductive types have the same parameters?

Following Arthur's suggestion in http://stackoverflow.com/a/17304209/403875 I changed my Fixpoint relation to a mutual Inductive relation which "builds up" the different comparisons between games ...
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### How to indicate decreasing in size of two coq inductive types

I'm trying to define the "game" inductive type for combinatorial games. I want a comparison method which tells if two games are "lessOrEq" "greatOrEq" "lessOrConf" "greatOrConf". Then I can check if ...
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### Coq: Problems with List In inductive

I'm new to Coq, but with some effort I was able to prove various inductive lemmas. However I get stuck on all exercises that uses the following inductive definition: Inductive In (A:Type) (y:A) : ...
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### Proving non-existence of an infinite inductive value in Coq

Suppose I have a very simple inductive type: Inductive ind : Set := | ind0 : ind | ind1 : ind -> ind. and I'd like to prove that certain values can't exist. Specifically, that there ...