# Tagged Questions

Coq is an interactive theorem prover.

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### Rewriting dependent functions

I'm trying to define the predecessor function for binary natural numbers (lists of bits). I want to restrict the input of my function to numbers that are trimmed (don't have leading zeros) and that ...
2k views

### Can I extract a Coq proof as a Haskell function?

Ever since I learned a little bit of Coq I wanted to learn to write a Coq proof of the so-called division algorithm that is actually a logical proposition: forall n m : nat, exists q : nat, exists r ...
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### Executing large Coq project with many files

I have a Coq project with a number of files (say x1.v, x2.v, ... xn.v) including a Makefile stored in folder "C:\Users\WK\Desktop\Personal\coq-project" and have installed Coq 8.3 at "C:\Coq" on my ...
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### Mutualy recursive function and termination checker in Coq

EDIT Require Import Bool List ZArith. Variable A: Type. Inductive error := | Todo. Inductive result (A : Type) : Type := Ok : A -> result A | Ko : error -> result A. ...
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### Taking the option element in the head of the list

I have type Variable l: list (a * b * option c * option d). Variable ls : list (list l). I would like to take the type option d from the head of the list and check the whole list after that. My ...
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### Proof on less than and less or equal on nat

Assuming the following definitions (the first two are taken from http://www.cis.upenn.edu/~bcpierce/sf/Basics.html): Fixpoint beq_nat (n m : nat) : bool := match n with | O => match m with ...
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### Use Coq to prove difference between relative numbers

How do you prove: forall m n : Z, m < n -> m -n < O in Coq? Many Thanks!
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### Lost on this exercise

I have to proof this: Variable A : Set. Variable P : A -> Prop. Variables R : A -> A -> Prop. Lemma pool : (forall x:A, ~P x) -> ~(exists x:A, ~ P x). So far I've done: intros. unfold ...
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### Coq: defining a function based on uniqueness and existence theorems

To isolate this issue as much as possible, suppose I begin a Coq session as follows. Parameter A : Type. Parameter B : Type. Parameter P : A -> B -> Prop. Axiom existence : forall a : A, ...
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### Solving this coq exercise

I'm learning COQ and I'm stuck on one of the book exercises. The book doesn't give me a solution so I don't know what to do. I've done the first one though. I have to translate these statements to ...
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### How to prove the lemma “(P \/ Q) /\ ~P -> Q.” in coq?

I tried to prove this lemma with the tatics [intros], [apply], [assumption], [destruct],[left], [right], [split] but failed. Can anyone teach me how to prove it? Lemma a : (P \/ Q) /\ ~P -> Q. ...
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### Assume Negation for Proof by Contradiction

I have a bunch of rules, which essentially entail that some proposition P can never be true. I now have to prove that P is false using Coq. In order to do so on paper, I would assume that P holds and ...
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### Assume Half a Disjunctive Premise for “or elimination” Proof

I think by this point I've read most if not all of the 81 questions tagged coq. Being very new to coq, I was unable to find an answer to this very simple question (which I'm fairly certain has not ...
283 views

### Impossible pattern in writing implicit proof object in coq

I trying to use coq as a programming language with dependent type. I created the following small program: Inductive Good : list nat -> Set := | GoodNonEmpty : forall h t, Good (h :: t). ...
203 views

Disclaimer: this is for a homework assignment I'm a coq noob, so I hope this is not a repeat question. I /have/ looked at this question, but my question seems to be unanswered still. I have the ...
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### Decoupling the data to be manipulated from the proofs that the manipulations are justified

I have a type of lists whose heads and tails must be in a certain sense "compatible": Inductive tag := A | B. (* Just an example *) Inductive element : tag -> tag -> Set := | AA : element A ...
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### Type error inside and outside Section

I have a function "HF" has type inside section S Open S. HF: forall f : dup_sig Sig, dup_ar f = ASignature.arity (F f) End S. Signature: Type Sig: Signature dp_Sig : Signature dup_sig : ...
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### exposing the structure of inductively defined terms in coq

The proof that typing derivations are unique in the simply-typed lambda calculus is trivial on paper. The proof that I am familiar with proceeds by complete induction on typing derivations. However, I ...
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### How to solve goals with invalid type equalities in Coq?

My proof scripts are giving me stupid type equalities like nat = bool or nat = list unit which I need to use to solve contradictory goals. In normal math, this would be trivial. Given sets bool := { ...
236 views

### Using an existential theorem in Coq

I have the following theorem in Coq: Theorem T : exists x:A, P x. I want to be able to use this value in a subsequent proof. I.E. I want to say something like: "let o represent a value such that P o. ...
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### Coq: Instantiating Multiple Generalizations?

Require Import ProofWeb. Variables x y z a : D. Variables p: D * D * D -> Prop. Theorem letra_a : (all x, p(a,x,x) /\ (all x, ( all y, ( all z, p(x,y,z))) -> p(f(x),y,f(z)))) -> ...
241 views

### Generalizing existential variables in Coq

I'm trying to prove P ?x, where P : A -> Prop and ?x : A is an existential variable. I can prove forall a:A, P a, so I need to generalize P ?x to forall a:A, P a. If ?x was an instantiated ...
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### Coq as part of continuous integration

In my current project we use Java and Coq. We have a continuous integration set up, using maven. We want to check coq files as part of it. I.e. we need: Download and install coq locally if it isn't ...
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### Is there an explicit type constructor for (->) in Coq?

I'm trying to define a class that provides identity and composition. Besides other useful instances (List with nil and concatenation; Relations with, well, identity and composition ;-) ), I'd like to ...
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### Trouble writing my notation for natural numbers in Coq

Why does Coq not accept this? Notation "[ d1 , .. , d2 ]" := (addition (multiply ( .. d1 .. ) ten) d2).
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### apply argument to equal functions in Coq

Suppose I have two functions f and g and I know f = g. Is there a forward reasoning 'function application' tactic that will allow me to add f a = g a to the context for some a in their common domain? ...
168 views

### Coq - Extract witness from Proposition

I'm trying to extract a witness from a coq proposition (or something like that...). I have something that goes like Parameter atom_fresh_for_list : forall (xs : list atom), {x : atom | ~ ...
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### Difference between Z3 and coq

I am wondering if someone can tell me the difference between Z3 and coq? Seems to me that coq is a proof assistant in that it requires the user to fill in the proof steps, whereas Z3 does not have ...
120 views

### how to name the assumption when remembering an expression?

The documentation for Coq carries the general admonition not to rely on the builtin naming mechanism, but select one's own names, lest the changes in the naming mechanism render past proofs invalid. ...
258 views

### Free variables in Coq

Is there any function/command to get/check if a free variable, lets say n:U, exists in a term/expression e, using Coq? Please share. For example, I want to state this "n does not occur in the free ...
124 views

### how to use modules to hide lemmas in coq?

I have a theorem T, its proof, and the zillion lemmas used in proving it. I would like to hide the lemmas, and make available only the theorem -- mainly because I don't want to have to think of good, ...
241 views

### Proofs on strings in coq

I want to prove 'reflexivity' property on strings. Please if you can help me how to proceed with the proof. Here is my code: Fixpoint beq_str (sa sb : String.string) {struct sb}: bool := ...
340 views

### Finish proof with false hypothesis in Coq

So I have a false hypothesis in a subgoal. It's an equality between different constructors. How do I finish the subgoal? H: List.Not_Empty Bit.Bit Bit.Zero (List.Empty Bit.Bit) = List.Empty Bit.Bit
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### Unable to provide long (1024+ character) inputs to the OCaml toplevel and coqtop (and Proof General)

Edit 4: It turns out that this is actually just a limitation of TTY input in general; there's nothing specific about OCaml, Coq, or Emacs which is causing the problem. I'm working on a Coq program ...
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### Coq: Error: The reference _ was not found in the current environment

I'm new to Coq. I'm having trouble defining lists, maps, and trees using units, products, and sums. I get the error message in the title. The code above the comment works fine, the code below it does ...
279 views

### Using coq, trying to prove a simple lemma on trees

Trying to prove correctness of a insertion function of elements into a bst I got stuck trying to prove a seemingly trivial lemma. My attempt so far: Inductive tree : Set := | leaf : tree | node : ...
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### Proof - Coq - Do I need induction?

I have a scenario where I want to prove a lemma including a number of string and list variables. Probably, it needs 'induction', but can anybody help me proving the lemma given below. If the rest of ...
431 views

### How can I prove propositional extensionality in Coq?

I'm trying to prove a substitution theorem about Prop, and I'm failing miserably. Can the following theorem be proven in coq, and if not, why not. Theorem prop_subst: forall (f : Prop -> ...
156 views

### Proving lemma with implication based on functions

I want to prove the lemma below. I am trying to to use tactic 'destruct', but I can't prove it. Please any body guide me how can I prove such lemmas. I can prove it for EmptyString, but not ...
420 views

### functions in Coq

I have to prove some formalised stuff. There are two functions, gets some strings and array of strings, compare if there is a match, and returns bool. I want to test them both in a lemma, and verify ...
550 views

### How do I convince coq that (A/\B)/\C == A /\ B /\ C?

In my proof I stumble upon problems where there is an A /\ B /\ C in my assumptions, and I need to prove (A /\ B) /\ C. These are logically exactly the same, but coq won't solve these with ...
126 views

### How to define a limited domain in coq

I am trying to define a domain in the proof checker coq. How do I do this? I'm trying to do the equivalent of V in [0,10]. I've tried to do Definition V := forall v in R, 0 <= v /\ v <= 10., ...
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### existential quantifier: how to refer to the instance

I have a theorem in which I show that an object exists that satisfies some property. I proved this theorem by constructing the object. Then, in another proof, I would like to refer to the object ...
782 views

### existential instantiation and generalization in coq

Can someone please give me a simple example of existential instantiation and existential generalization in Coq? When I want to prove exists x, P, where P is some Prop that uses x, I often want to name ...
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### Error: Dynamic link not supported when linking ocaml project under Lion 10.7

I hope that's the right place to my question. Actually I'm coq user and I'm trying to implement a new tactic using ocaml under "Mac OS X Lion 10.7.4 ". I have installed all the libraries that I may ...
289 views

### induction hypothesis for even numbers

I am trying to write an induction hypothesis specifically for proving properties of even numbers. I formulated and proved the following: Theorem ind_hyp_on_evens: forall (p : nat -> Prop), (p 0 ...
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### Can I extract Positive, Nat to int32, Z to int?

Hi I am writing an extraction from Coq to Ocaml, I would like to convert type: positive --> int32 N -> int32 but I want to keep type Z is int Here is the code I am doing to extract these ...
516 views

### Error in defining Ackermann in Coq

I am trying to define the Ackermann-Peters function in Coq, and I'm getting an error message that I don't understand. As you can see, I'm packaging the arguments a, b of Ackermann in a pair ab; I ...