# Tagged Questions

Coq is a formal proof management system and semi-interactive theorem prover. Coq is used for the certification of programming language certifications, the formalization of mathematical theorems, teaching, and more.

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### How to prove False = 0<>0 [duplicate]

How can I prove Goal False = (0<>0). ? I tried omega, and I could not find any lemma that contains (False = ) or ( = False).
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### How to return a (intro'd) hypothesis back to the goal formula?

For the proof: Parameter A B : Prop. Goal A->B. intro A. I get: 1 subgoals A : A ______________________________________(1/1) B How do I return then A back to the goal section? To return to: ...
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### How to tell Proof General that “.csv” != “.v”

Every time I open a .csv file in an Emacs buffer, Proof General starts up (unless it's already started) and resets my windows. This really throws off my Emacs groove and needs to stop. The only part ...
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### injectivity of inl and inr in standard library

Where in the Coq standard library can I find a lemma stating that inl and inr are injections? That is, forall (A B : Type)(x y : A), inl B x = inl B y -> x = y, and analogously for the right-hand ...
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### Coq can't see that two types are the same

I am trying to define the rev function on a vector, the size of it is embedded in it and I can't figure out how to define the rev function on it. Here is my type definition: Inductive vect {X : ...
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### How to show that two variables of inductive type are inequal if their fields are not equal?

Suppose I have an inductive type: Inductive addr : Type := mk_addr : Z -> Z -> addr. Is it possible to prove the following goal? Goal forall (x y z : Z), y <> z -> mk_addr x y ...
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### Coq inductive reasoning about ACSL inductive predicates?

Is it possible to use induction on inductive predicates defined in ACSL? Consider the following example from the ACSL manual: struct List { int value; struct List* next; }; /*@ inductive ...
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### How do I change a concrete variable to an existentially quantified var in a hypothesis?

Say I have a hypothesis like this: FooProp a b I want to change the hypothesis to this form: exists a, FooProp a b How can I do this? I know I can do assert (exists a, FooProp a b) by eauto but ...
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### Using lambda in Fixpoint Coq definitions

I am trying to use List.map in recursive definition, mapping over a list using currently defined recursive function as an argument. Is it possible at all? I can define my own recursive fixpoint ...
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### Compute with a recursive function defined by well-defined induction

When I use Function to define a non-structurally recursive function in Coq, the resulting object behaves strangely when a specific computation is asked. Indeed, instead of giving directly the result, ...
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### How do I the calculate the sqrt of a natural or rational number in coq?

I'm learning coq and I'm trying to make my own Point and Line data types. I'd like to make a function that returns the length of a line, but I can't seem to find the sqrt function that will return a ...
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### How would I prove that b = c if (andb b c = orb b c) in coq?

I'm new to coq and I'm trying to prove this... Theorem andb_eq_orb : forall (b c : bool), (andb b c = orb b c) -> (b = c). Here is my proof, but I get stuck when I get to the goal (false = ...
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### Incorrect elimination of X in the inductive type “or”:

I am trying to define a relatively simple function on Coq: (* Preliminaries *) Require Import Vector. Definition Vnth {A:Type} {n} (v : Vector.t A n) : forall i, i < n -> A. admit. ...
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### What does “Error: Universe inconsistency” mean in Coq?

I am working through Software Foundations and am currently doing the exercises on Church numerals. Here is the type signature of a natural number: Definition nat := forall X : Type, (X -> X) ...
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### Define an inductive dependent-type with constraints on the type-parameter

I try to define an inductive dependent-type in Coq to represent bit-vector variables in bit-vector logic. I read this blog post by Xavier Leroy in which he defines such a structure as follow: ...
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### convoy pattern and match involving inequality

I have a problem implementing simple function and I am pretty sure the answer is a "convoy pattern" but I just could not figure out how to apply it in this particular case. Here is a full example: ...
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### Using eexists to construct record terms in Coq

Suppose there is a denary relation R over some type A. Variable A : Type. Variable R : A -> A -> A -> A -> A -> A -> A -> A -> A -> A -> Prop. X and Y are slightly ...
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### A Coq analogue of the Burali-Forti paradox?

I just learned from the CMU HoTT lectures that, although Check Type returns Type : Type in Coq, the Types on the left and right are implicitly indexed by different numbers, because it would lead to a ...
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### proof general cannot find library or its source file even with coq-load-path-include-current and coq-compile-before-require

I'm on windows 8.1 with proof general 4.2 and emacs 24.2.1. I have set coq-compile-before-require and coq-load-path-include-current to on, but when I try to require a library whose source file is in ...
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### Coq: manage LoadPath in project with subdirectories

I have a Coq project with its libraries organised into subdirectories, something like: …/MyProj/Auxiliary/Aux.v …/MyProj/Main/Main.v (imports Auxiliary/Aux.v) When I compile the files, I expect to ...
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### Can I declare a 'polymorphic' axiom in Coq?

I'd like to have an axiom which accepts either a nat or a bool and returns a nat. Something like Axiom poly_axiom {A : Set}: A -> nat. But Coq refused to accept such a 'polymorphic' axiom. Is ...
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### Tabbing gives error in proof general/emacs

I have emacs 23.3.1 on Ubuntu 12.04 LTS, with proof general 4.2. When editing coq files in the "coq Holes" mode (which is the default when I hack coq), I cannot tab. Doing so gives the error ...
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### Why cannot evaluate a fix-defined expression with an abstract value in Coq?

I need to prove a theorem: Theorem t : forall x, (fix f (n : nat) : nat := n) x = x. An informal proof will be as simple as f is an identity function. So the result is the same as the input. If ...
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### extracting evidence of equality from match

I am trying to make the following work: Definition gen `{A:Type} {i o: nat} (f: nat -> (option nat)) {ibound: forall (n n':nat), f n = Some n' -> n' < i} ...
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### Why are logical connectives and booleans separate in Coq?

I come from a JavaScript/Ruby programming background and am used to this being how true/false works (in JS): !true // false !false // true Then you can use those true/false values with && ...
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### Why unfold does not work on lt(less-than) in Coq?

I'd like to prove lt n m -> le n m since it does not exist in Coq's standard library. Though in Coq.Init.Peano, lt m n is defined as S m <= n, I cannot unfold lt in the hypothesis to use such ...
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### How to instantiate a variable of forall in a hypothesis in Coq?

I have two hypotheses IHl: forall (lr : list nat) (d x : nat), d = x \/ In x l' -> (something else) Head : d = x while I want to apply IHl on Head since it satisfies d = x \/ In x l of IHl. ...
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### How to define non-empty set in Coq?

Trying to create my first Coq definitions after doing many tutorials. Wondering how to define something simple like an alphabet, if the definition is: Σ is an alphabet iff it's a finite nonempty ...
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### How do you look up where identifiers are defined in Coq efficiently?

In most IDEs or text editors, you can right-click a term and it takes you to the file where that term is defined. CoqIDE doesn't seem to have that, so I've been doing coqdoc myfile.v --html, then ...
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### Is there a translator from Haskell to Coq?

If I want to write proofs and algorithms/semantics using Coq on a Haskell program. How can I translate from Haskell to Coq to do this? It seems that there are tools to translate OCaml programs. But ...
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### Why does use of Coq's setoid_replace “by” clause need an extra idtac?

I encountered a strange situation using setoid_replace where a proof step of the form: setoid_replace (a - c + d) with b by my_tactic fails with Error: No matching clauses for match goal, but after ...
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### Proving False with negative inductive types in Coq

The third chapter of CPDT briefly discusses why negative inductive types are forbidden in Coq. If we had Inductive term : Set := | App : term -> term -> term | Abs : (term -> term) -> ...
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### Inductively defined dense vector lemmas

Inspired by another question on StackOverflow, I defined a dense vector to be a vector with option A type elements that only contains Some _ elements, and no None elements. Require Import Vector. ...
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### Pattern matching multiple constructors in a single clause in Coq

Suppose I have an inductive type of arithmetical expressions exp Inductive exp : Type := | num : nat -> exp | plus : exp -> exp -> exp | minus : exp -> exp -> exp | mult : exp -> ...
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### In coq, how to do “induction n eqn: Hn” in a way that doesn't mess up the inductive hypothesis?

When using induction, I'd like to have hypotheses n = 0 and n = S n' to separate the cases. Section x. Variable P : nat -> Prop. Axiom P0: P 0. Axiom PSn : forall n, P n -> P (S n). ...
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### Coq “convoy pattern”

I am trying to use "convoy pattern" to preserve dependency between 3 variables (two parameters and return value): Require Import Vector. (* "sparse" vector type *) Notation svector A n := (Vector.t ...
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### Sum of exponents with same base

How can I prove the following statement in Coq? forall x: nat, x >= 1 -> 2 * 2 ^ (x - 1) = 2 ^ x. I found lemma pow_add_r in module NZPow but for some reason I can´t use it. Thanks, Marcus. ...
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### Handling let in hypothesis

As an exercise in Coq, I'm trying to prove that the following function returns a pair of lists of equal length. Require Import List. Fixpoint split (A B:Set)(x:list (A*B)) : (list A)*(list B) := ...
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### Is equality decidable on any coinductive type?

this is my first post, apologies if it I have made mistakes. I suspect that, in Coq, coinductive types like Stream do not have decidable equality. That is, given two streams s and t, it is not ...
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### How to run Athena | Coq | Isabelle codes remotely?

I' ve been creating a Web IDE (WIDE) for theorem proving in Computer Science. You may know, there are 3 most common proof assitants which names Athena, Isabelle and Coq. Most of computer scientist ...
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### How to assign a natural number to variable in Coq?

How can I assign a natural number to a register (a register is represented by natural number). For example how do I load a natural number n to register k? How can I compare two natural numbers and ...
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### CoqIDE loadpath error for ssreflect

I am a Coq newbie and therefore to improve my understanding of proof checking I am trying to use the Ssreflect library. I have installed Ssreflect v 1.5 on a Mac OS v 10.10.3 ( Yosemite ) which runs ...
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### Why can I sometimes prove a goal via a lemma, but not directly?

Consider the function defined below. It's not really important what it does. Require Import Ring. Require Import Vector. Require Import ArithRing. Fixpoint ScatHUnion_0 {A} (n:nat) (pad:nat) : t ...
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### Partial application is not allowed while using Function

I get the following error message: "failure in proveterminate Error: Partial application of function convert_btree_to_tree in its body is not allowed while using Function" from the following piece ...
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### Solving (BEq a a0 = BTrue \/ BEq a a0 = BFalse) in Coq

(BEq a a0 = BTrue \/ BEq a a0 = BFalse) is either true or false since a==a0 or a!=a0. However, I'm not sure how I can get Coq to see this. Here is my complete proof window: 4 subgoal a : aexp a0 : ...
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### How does 'elim' in Coq work on existential quantifier?

I'm confused by Coq on its way dealing with existential quantification. I have a predicate P and an assumption H P : nat -> Prop H : exists n, P n while the current goal is (whatever) (Some ...
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### Coq can't find subterm when using rewrite tactic

I'm trying to do a modified proof of compile_correct from the first chapter of Certified Programming with Dependent Types. In my version, I try to make use of the fact that progDenote is a fold, and ...
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### How to prove remove_copy from ACSL by example

I tried to prove the algorithm remove copy (the first version) from "ACSL by Example" version 11.1.0. I used Alt-Ergo (0.99.1), CVC3 (2.4.1), Z3 (4.3.2), CVC4 (1.4) and Why3 (0.85) The time limit in ...
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### Coq: how to prove existence of list having existence of an element?

Say I have the axiom stating availability of an element: Axiom FLP_Lemma3_p1: forall cfg, bivalent cfg -> exists msg, bivalent (run cfg [msg]). How can prove the same property holds for an ...
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### coq Hello World example (with opam) can't find libraries

I was following a coq HelloWorld tutorial (code below), and couldn't get the program to compile. I followed the installation steps and installed opam install coq:io:system. My opam installation is at ...