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Questions tagged [coq]

Coq is a formal proof management system, semi-interactive theorem prover and functional programming language. Coq is used for software verification, the formalization of programming languages, the formalization of mathematical theorems, teaching, and more. Due to the interactive nature of Coq, we recommend questions to link to executable examples at https://x80.org/collacoq/ if deemed appropriate.

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Install coq proof assistant from source - switch package not determined

On an M1 Mac under macOS Sonoma 14.5, I'm trying to install from source coq version 2023.11.0. At the step of "create opam switch", I get following error: [CP.2023.11.0.patch_ocaml] ...
murray's user avatar
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Tac to derive contradiction from circular equality (ie. smarter to discriminate)

Inductive Foo : Type := | foo : Foo | bar : Foo -> Foo. Lemma Foo_contr f: bar f = f -> False. Proof. intros H. induction f as [|f IH]. - discriminate. - injection H. apply IH....
math2001's user avatar
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Coq repeating "destruct" for disjunctive hypothesis causing unwanted destruction in the end

I need to prove a theorem involving 2 variables a and b, a hypothesis H specifying the possible values of a (a = v1 \/ a = v2 \/ ... \/ a = vn), and a hypothesis H0 specifying values of b (b = v1' \/ ...
Cs_J's user avatar
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How to make OCaml (or Coq) code from the llvmir code using vellvm framework

I'm studying vellvm framework. How can I verify simple function on C with vellvm? I know that I can use assertions inside .ll code ; ASSERT EQ: i32 0 = call i32 @foo(i32 0) but I want more This is the ...
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How to apply simple lemma with complex instantiation in Coq?

I have a goal that looks like (A <-> B) -> ~A with complex expressions A and B, and I want my goal to become ~B. I tried creating a simple Lemma that (A <-> B) -> ~A -> ~B Section ...
kutschkem's user avatar
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Induction on Inductive Type Without Base Case in Coq

I'm trying to understand why a particular proof in Coq works. Here is the inductive type definition and the theorem I'm trying to prove: Inductive my_s : Type := | loop (s : my_s). Theorem p_of_s : ...
FoxyZ's user avatar
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Functional Extensionality for Propositional Functions

I've created the following simple definitions for representing sets of objects of type X as functions X -> Prop and defined various operations such as cup (union). However, before I get started ...
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Coq dictionary implementations supporting custom key domain that are easy to prove equivalence?

I need to implement a dictionary type in Coq, whose keys need to be from an inductive type defined by myself, and I need to make it easy to prove equivalence between dictionaries. What are some good ...
Cs_J's user avatar
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Applying lemma using Vectors in Coq

I have proved the following Lemma exists_distribution: forall (a:Prop)(Omega:Set)(p:Omega->Prop), (exists x:Omega, p x->a)<-> ((exists x:Omega,~(p x))\/(exists x:Omega,a)). Now I would ...
HouseCorgi's user avatar
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Frama-C with Coq interactive prover

I am trying to run Frama-C on a small code sample. It works pretty well: # frama-c -wp bubble_sort.c [kernel] Parsing bubble_sort.c (with preprocessing) [wp] Warning: Missing RTE guards [...
Meir Benayoun's user avatar
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How to use lambda functions in COQ

I'm struggling with the basic syntax and I'm going to need to see some examples. I get the impression that I need to declare a polymorphic type param. Notation "'λ' x .. y , t" := (fun x =&...
Innovations Anonymous's user avatar
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How to match implication without prior intros?

I am trying to write a tactic to check if my goal is an implication without having to introduce anything beforehand. Furthermore I would like this tactic to be compatible with any amount of variables ...
HouseCorgi's user avatar
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Is there a lightweight way to define a mutable dictionary that can return all of its keys in Coq?

I want to define a mutable dictionary that can return all of its keys in its domain. Keys don't have to be ordered. I searched in the coq library doc on the internet and didn't seem to find anything ...
Cs_J's user avatar
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Constructing proof terms inside a recursive function

Just starting with Coq, trying to write a list insertion function that will return either the new list, or if the provided index was illegal, a proof thereof using sumor. I'm fine with the recursion, ...
sp1ff's user avatar
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Coq notation defined inside a module expecting type without module prefix

I'm writing a compiler and its proof for a toy language, and I have files L1, L2, C, and P, where L1 and L2 contain the abstract syntax and operational semantics of languages l1 and l2, C containing ...
Cs_J's user avatar
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How can I prove that theorem in coq: (x | a) -> (x | b) -> x <= (gcd a b)?

I have this realization of greatest common divisor: Fixpoint gcd_ (m n d : nat) : nat := match d with | 0 => if (m =? 0) then n else m | S k => if (m mod S k =? 0) && (n mod S k =? 0) ...
Konstantin Abdullin's user avatar
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Beta-reduction after delta-reduction in unfold tactic

According to the coq manual, the unfold tactic performs delta reduction on a definition, followed by several other reductions, including beta-reduction. It seems that sometimes, to trigger beta-...
FH35's user avatar
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Can a dependently typed language be Turing complete? [closed]

It seems as though dependently typed languages are often not Turing complete. Why can we not allow every function to have general recursion (which would make the language Turing complete), instead of ...
Municipal-Chinook-7's user avatar
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Convert list to vector in coq

I'm pretty new to using coq and I'm a bit confused about vectors. I want to convert a list into a vector with the same content. I'm trying pattern matching, but it keeps throwing errors about the ...
Helen's user avatar
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Defining mutually recursive types in Coq?

Suppose I have types A,B,C,D,E,F. One of the constructors of A takes an argument with type F; a constructor of B requires A, a constructor of D requires arguments of types C and A, E requires D and F ...
Cs_J's user avatar
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How to mix sections with hints in Coq?

I am writing something heavily involving typeclasses and I would like to utilize hints to ease proving local lemmas as well as exported theorems. For instance, consider Class MyClass (A : Type) := ...
radrow's user avatar
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Lemma about a graph in Coq

I need to prove a Lemma in Coq, about a connected graph with certain properties: the vertices of the graph are of type V:Type, and there is a function f: V -> nat which associates a natural number ...
FH35's user avatar
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Error: Cannot find a physical path bound to logical path Strands. in coq

I have coq file and was working on it for days but now the file giving me following error: Error: Cannot find a physical path bound to logical path Strands. also the required packages are as under: ...
Sana's user avatar
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How to prove that forall n m, n <= m -> m <= n -> n = m

Theorem le_trans: forall n m o, n <= m -> m <= o -> n <= o. Proof. intros n m o Lnm Lmo. generalize dependent Lnm. generalize dependent n. induction Lmo. - intros. apply Lnm. - ...
sesame ball's user avatar
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Is there an intuitionistic proof of `(A -> B \/ C) -> (A -> B) \/ (A -> C)`?

Following is a useful lemma in classical propositional logic. (A -> B \/ C) <-> (A -> B) \/ (A -> C). The backward direction is easily proved. But I could not find an intuitionistic ...
mindconnect.cc's user avatar
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Eliminating impossible branches in Coq dependent pattern matching

I'm having troubles with understanding pattern matching on dependent types. Let's say we have following code: Variant Op := op1 | op2. Variant Res : Op -> Set := | r1 : Res op1 | r2 : Res op2 | rb ...
Doktor Diagoras's user avatar
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How to use coq to prove this firstn and nth question?

Theorem fiset_ref_fact : forall (r r' n : nat) (f f' D g g' h h' : list nat) (b b' : bool), length f = n /\ n > 0 /\ r < n /\ h = firstn r f /\ h' = (app h ((nth r f 0)::nil)) /\ r' = r + ...
io ieong's user avatar
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InteractionTrees library - simple program on ASM

I am trying to write simple program on ASM (a simple control-flow-graph language) from this tutorial: InteractionTrees -> ASM.v My final goal is to prove its correctness, using the library's ...
Natasha Klaus's user avatar
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Installing Coq on Windows on GitHub Actions succeeds on a repo, and fails on another repo

I'm trying to install Coq on Windows on GitHub Actions, but seeing strange results. I tried the following script, but couldn't install Coq because of the missing gmp.h error. name: CI on: push: ...
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How to instruct `auto` to simplify the goal during proof search?

A minimal example of my issue looks as follows: Goal let x := True in x. This is immediately solved by simpl. auto., but auto. does not work. In my actual case, the search tree is a bit bigger than ...
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Inductive from CoInductive?

It is possible to represent CoInductive using parts that are Inductive. As a simple example, CoInductive stream A := | SCons : A -> stream A -> stream A . Arguments SCons {A}. CoInductive ...
scubed's user avatar
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Is is possible to rename a coq term?

Sorry, I'm not sure if the title is the adequate question. I have been going through Logical Foundations. In the Lemma "double_plus" i solved it with this solution: Lemma double_plus : ...
udduu's user avatar
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Coq : mutually recursive definitions with [mrec] in InteractionTrees Library

I'm studying this great library for Representing Recursive and Impure Programs in Coq I am having problems with mutual recursion (very first example in documentation gives me an error) https://...
Natasha Klaus's user avatar
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Is there a function that returns a list of values with specific type in OCaml?

In Haskell, using listify with Data can extract values of a specific type from a deeply nested structure without lots of getters. For example, with the following code: {-# LANGUAGE DeriveDataTypeable #...
toku-sa-n's user avatar
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How to prove (X !-> 3) =[ <{ X := X + 2 }> ]=> (X !-> 5)?

I know how to prove 3 + 2 = 5 using Imp, defined in Software Foundations, Volume 1. Definition plus2_3_is_5: Prop := forall (st: state), (X !-> 3) =[ <{ X := X + 2 }> ]=> st -> st X = ...
mindconnect.cc's user avatar
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Showing polynomial equality in coq/ssreflect

I am trying to prove equality of polynomials by explicit computation in coq. Here's an example showing where I get stuck: From mathcomp Require Import all_ssreflect all_algebra. Set Implicit ...
user6584's user avatar
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Syntax of the case tactic in coq

Can someone explain to me what the following coq tactic is doing? case x : fun H => [|[]] // _. How would I rewrite this using destruct? Even better, can anyone point me to somewhere in the coq ...
user6584's user avatar
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Why assuming singleton elimination and definitional proof irrelevance leads to UIP, in Coq?

I was reading the paper Definitional proof-irrelevance without K, which states, in page 3, that If proof irrelevance holds for the equality type, every equality has at most one proof, which is known ...
Henrique Guerra's user avatar
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1 answer
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Understanding nat_ind2 in Logical Foundations

As an alternative induction principle of nat, nat_ind2 is defined like so: Definition nat_ind2 : forall (P : nat -> Prop), P 0 -> P 1 -> (forall n : nat, P n -> P (S(S n))) -> ...
confusedcius's user avatar
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What `dependent induction` tactic does in Coq and how to use it

Can you please provide me with high-level explanation on which usecases dependent induction / dependent destruct tactics have, and how they work (I would be grateful for explanation high-level enough ...
blonded04's user avatar
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Split multiple conjuncts in the goal

Is there a tactic to split multiple conjuncts in a goal into subgoals? If I have the goal P /\ Q /\ R, I want to split it to produce three subgoals at once: P, Q, and R I can't seem to find any info ...
confusedcius's user avatar
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Coq can't define an inductive proposition

My Coq compiler is not allowing for inductive propositions as: Inductive relation : nat -> nat -> Prop := | A : relation 1 2 | B : relation 2 3. Throws: Error: The reference B was not found ...
Ulises Torrella's user avatar
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Coq Decreasing Argument mapping

I have a graph defined as follows. Definition ldd_state : Type := gmap loc (nat * (loc * loc)). This is a mapping from a loc (positive) to a value nat, and two children. Every node "lives" ...
someStudentCS's user avatar
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The `specialize` tatic in Coq does not work well with typeclasses?

I have a simple question about using the specialize tactic in Coq for typeclass-based code. Specifically, I am using stdpp and I have a type lcmm_memory that is defined to be gmap nat lcmm_val. Why ...
andreas's user avatar
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Multiple Assignements in a Coq Map to the same value

I'm given the following definition of com that sssigns new values to more than one variable in a single command.: Inductive com : Type := | CSkip | CAsgn (xs : list string) (es : list aexp) (* <...
user23439360's user avatar
1 vote
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Decider for lists In Fixpoint

I am relatively new to coq and i am not sure how to procede here. I want to write a decidability function for the In Fixpoint of the list library like this: Program Fixpoint InDec (s : K) (l : list K) ...
Deedit's user avatar
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VSCoq Error: Connection to server got closed. Server will not be restarted

I am using VSCoq with Ubuntu and WSL for a Formal Methods class I am taking this semester. I had it working fine (a trial in and of itself), but am all of a sudden receiving the following errors: [...
catie's user avatar
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How do I move a let variable to a separate hypothesis?

In Coq, as a simplified example (using False to ignore the conclusion), Theorem example (f : nat -> bool) (g : bool -> bool -> bool) (cmplx := let a := f 0 in let b := ...
scubed's user avatar
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Coq inductive not right form

I have troubles with a not well formed IH (or I am making mistakes). From stdpp Require Import mapset. From stdpp Require Import gmap. From stdpp Require Import options. From stdpp Require Import ...
someStudentCS's user avatar
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3 answers
101 views

How can I handle this `false = true` case?

I am trying to prove the following lemma. Inductive bool : Type := | true | false. Lemma andb_true_iff : forall b1 b2 : bool, b1 && b2 = true <-> b1 = true /\ b2 = true. Proof. ...
calvin's user avatar
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