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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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Fail to prove a permutation property

I have created this simple type : Inductive implist : nat -> list nat -> Prop := | GSSingle : forall (n:nat), implist n [n] | GSPairLeft : forall (a b n:nat) (l:list nat), implist n l ->...
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Is it possible to check the length of two strings before pattern matching against them?

I'm programming in Coq and want to eliminate non-exhaustive case matching by checking the length of the two strings first, for example Definition foo (word1 word2 : word) : option := if length ...
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Equivalence but not congruence

All I'm working on sf/plf chapter Equiv. There is an exercise We've shown that the [cequiv] relation is both an equivalence and a congruence on commands. Can you think of a relation on commands that ...
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Cannot apply one hypothesis to another

I am very new to Coq and I'm trying to prove that if two functions are injectives, the composition of theses two functions is also injective. Here is my code: Definition compose {A B C} (g: B -> C) ...
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Prove recursive function exists using only `nat_ind`

I'm trying to prove the following in Coq: ∀ B: Type, ∀ a: B, ∀ b: nat -> B -> B, ∃ f: nat -> B, f 0 = a ∧ ∀ n: nat, f (S n) = b n (f n). Which implies that a fairly general class of ...
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Fail to rewrite list with app_removelast_last

I have an environment which looks like this: P: list nat -> Prop Hnil: P [] ... xs, xp: list nat Hex: xp = a :: xs Hnilcons: xp <> [] =================== P xp I'd like to rewrite the goal to ...
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How can i proof by absurd with coq?

I am reading Logical Foundations from Software Foundations series and i saw the plus_id_example that is: Theorem plus_id_example : forall n m:nat, n = m -> n + n = m + m. Proof. intros n m. ...
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Proof on inductive type in Coq

I try to prove the following theorem: Theorem implistImpliesOdd : forall (n:nat) (l:list nat), implist n l -> Nat.Odd(length l). where implist is as follows : Inductive implist : nat -> list ...
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Proof objects in the identity type

I'm reading through software foundation and they define equality as Inductive eq {X:Type} : X -> X -> Prop := | eq_refl : forall x, eq x x. Notation "x == y" := (eq x y) ...
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Precise control of conversion in Coq

I try to prove the following theorem in Coq: Theorem simple : forall (n b:nat) (input output: list nat) , short (n::b::input) true (n::output) = None -> short (b::input) false ...
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Why coq doesn't use subtyping for logical or?

By subtyping, here I mean implicit coercion between types, not sig. In programming languages, sum types have associated data and it matters which variant is being used, so e.g. A can not be a subtype ...
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Why can I not apply f_equal to a hypothesis?

In my list of hypothesis, I have: X : Type l' : list X n' : nat H : S (length l') = S n' My goal is length l' = n'. So I tried f_equal in H. But I get the following error: Syntax error: [tactic:...
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How can I "specialize" a polymorphic type in Coq?

(Note, my goal is to learn more about Coq, not necessarily solve this particular problem. IRL, I expect I would just refactor to remove the offending type in that situation.) I have a type defined ...
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How to deal with division in COQ?

How to deal with with the division in a goal? Because I have a goal which is clearly true... However I cannot use lia and I think that this is related to the division. 2 ^ k / 2 ≤ 2 ^ k Bellow is my ...
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Searching for a counterexample to a decidable predicate

It feels like the following Coq statement should be true constructively: Require Import Decidable. Lemma dec_search_nat_counterexample (P : nat -> Prop) (decH : forall i, decidable (P i)) : (~ (...
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2 votes
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Adding an old version of Ocaml to Opam

I am trying to install Coq version 8.10.2 using Opam and from this output, I assume Coq 8.10.2 needs an ocaml compiler with version < 4.10 Missing dependency: - (invariant) -> coq = 8.10.2 -&...
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Symbolic manipulation of terms in Coq

Proof states like this often arise in my Coq studies: 1 goal n : nat IHn : fib_v1 n <= fib_v1 (S n) ______________________________________(1/1) fib_v1 (S n) <= fib_v1 (S (S n)) Coq complains ...
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In Coq, is there a way to prove a premise of a hypothesis conveniently?

I have H : P -> Q in my proof context, and I need Q to complete my proof, but I don't have any evidence of P: Is there a tactic or anything else that can make the premise P a new goal, then replace ...
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How proof functions are combined in Coq

In the following simple theorem the proof is given directly in the form of a proof function. I'd like to understand how the two terms, parenthesized to reflect my concept, combine into a final proof ...
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How can i model something with persistent state in coq?

In our university assignment we were asked to model the object of our choice in predicate and propositional logic. My group went for the 555 timer integrated circuit. We currently face the issue of ...
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in coq how to assume equality of two natural numbers

I want to use this definition to assume that certain equalities on the members of set R hold: Definition wiring: Prop (globalHasVoltage -> (voltageOf voltageIn) = vcc) /\ (...
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How to exhaust the match with in coq using something like default or or clause?

How can i write a switch state similar to this one (in rust), in coq? In particular I'm curios how to merge branches in coq to produce same output, and exhaust the remaining branches via some default ...
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2 answers
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Proof by contradiction in Coq

I am trying to understand the apparent paradox of the logical framework of theorem provers like Coq not including LEM yet also being able to construct proofs by contradiction. Specifically the ...
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Using or_comm in Coq

I want to prove the following theorem: Theorem T14 : forall s t u, S u s t <-> S u t s. Where S is defined like this: Definition S u s t := forall v, ((ObS u v) <-> (ObS v s \/ ObS v ...
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Coq Qed raise a warning with admitted lemmas

When developing a big system in Coq, I usually admit many lemmas and see whether the important theorem works or not, and then solve lemmas one by one. Coq accepts Qed. even with admitted lemmas, so ...
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multiplication of two binary numbers

I need to do the function that multiplicates two binary numbers represented by a list of booleans. Here what I wrote : Fixpoint brmul_r (x y res: list bool): list bool := match x,y,res with |x,y,...
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how to code in coq a function that sum the integers represented by the 2 lists and boolean representing a holdback?

I want to set the recursive function badd_r: list bool -> list bool -> bool -> list bool that sum the integers represented by the 2 lists and boolean representing a holdback. I need to use ...
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proving a binary add function

I'm fairly new to the Coq language and I want to prove a function that does an binary add from numbers represented as a list (least significant bit upfront). I have created this badd function that ...
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How to dependent match on a list with two elements?

I'm trying to understand dependent types and dependent match in Coq, I have the code below, at the bottom I have the add_pair function, the idea is that I want to receive a (dependent) list with ...
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How can I to prove this theorem through induction?

Proof: Lemma sum_square_p : forall n, 6 * sum_n2 n = n * (n + 1) * (2 * n + 1). My Defined Fixpoint: Fixpoint sum_n2 n := match n with 0 => 0 | S p => n*n + sum_n2 p end. after applying these ...
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1 vote
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Importing HoTT library in Coq

I'm trying to use coq-hott library in Coq, but the import won't work. I'm working in the container of the coqorg/coq:latest docker image. After starting the container I've done the following: opam ...
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How to do an inductive proof

I have to show that : Lemma bsuccOK: forall l, value (bsucc l) = S (value l). with an induction proof, but I don't understand how to do it. Here is the bsucc function: Fixpoint bsucc (l: list bool): ...
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Found a constructor of inductive type bool while a constructor of list is expected

I have the following question : Define the fonction value : list bool -> nat that return the value represented by a list of booleans(binary number to decimal number). For example, value [false;true;...
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Unfolding a sum and making it match hypotheses

I've unfolded everything except the times 6, but I'm having trouble getting rid of the extra "+1" which is preventing me from rewriting 1 subgoal n : nat IHn : 6 * sum_n2 n = n * (n + 1) * (...
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setoid_rewrite: rewrite under bindings with 2 parameters

I'm able to use rewrite under bindings with one parameter Require Import Setoid. Require Import Relation_Definitions. Require Import FunctionalExtensionality. Parameters f f' : nat -> nat. ...
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3 votes
2 answers
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rewriting hypothesis to false with a contradictory theorem

I want to show that [seq q x t | x <- iota 0 (t + 1)] != [::] I decided to destruct iota 0 (t + 1) because I have a lemma that says: iota 0 (t + 1) != [::] So the first case of destruct should ...
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3 votes
1 answer
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How to get a better proof style in Coq? [closed]

I'm learning how to use Coq. And for now, I can prove almost all the small theorems I encounter. I'm pretty happy with my level, even though I still have a lot of progress to make. However, my proofs ...
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Pose proof in Coq

I’m trying to prove a theorem in Coq. My current context is: 1 subgoal s, x : Entity Pssx : Ps s x Fxs : F x s IPssx : F x s /\ Ps s x t : Entity Ctss : C t s s Pstx : Ps t x Fxt : F x t ...
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1 vote
1 answer
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Using tuples when constructing inductive types

I'm trying to use a pair to pass as an argument into an inductive type in Coq Definition pair := (nat,nat). Inductive use_pair := | mktriplet : pair -> nat -> use_pair. However, this gives ...
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Define a function based on a relation in Coq

I'm working on a theory in which there is a relation C defined as Parameter Entity: Set. Parameter C : Entity -> Entity -> Entity -> Prop. The relation C is a relation of composition of ...
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1 vote
2 answers
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Using the commutativity of the AND operator in Coq

I’m trying to prove something in Coq using the commutativity of the logic AND operator. I coded this short example: Axiom ax1 : A /\ B. Theorem th1 : B /\ A. Proof. pose proof (ax1) as H. symmetry....
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1 vote
1 answer
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How to solve a simple inequality in COQ with the same variable which is adding on both sides of the inequality

As you can see I am pretty close to build a proof in COQ, however I am stuck in such inequation. Which is pretty clear, since l2 = hd2 :: tl2. I just want to get rid of the length l1 from both sides ...
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I am trying to solve constant is not surjective through coq

This is the work I have so far. And I'm seemed to be stuck here. If anyone has any idea I would appreciate the help. Definition relation (X Y : Type) := X -> Y -> Prop. Definition surjective {X ...
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How to prove insert_BST in Coq

I want to prove that when receiving a binary search tree as an argument, the [insert] function generates another binary search tree. Insert Function: Fixpoint insert {V : Type} (x : key) (v : V) (t : ...
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How to build a proof of correctness in coq for elements_tr

I want to build a proof of correctness for elements_tr... It is actually related to some sort of reimplementation of BSTs with int keys. Elements_tr is defined as follows: Fixpoint elements_aux {V : ...
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Coq Program Fixpoint vs equations as far as best way to get reduction lemmas?

I am trying to prove that particular implementations of how to calculate the edit distance between two strings are correct and yield identical results. I went with the most natural way to define edit ...
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Coq: easiest way to construct members of a decidable sigma type?

Consider the following toy development: Inductive IsEven: nat -> Prop := | is_even_z : IsEven 0 | is_even_S : forall n, IsEven n -> IsEven (S (S n)). Definition EvenNat := {n | IsEven n}. I'd ...
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Coq: what does it mean to "saturate" a proof's context?

As found in MPI-SWS' std++: (** The class [TCUnless] can be used to check that search for [P] fails. This is useful as a guard for certain instances together with classes like [TCFastDone] (see [...
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3 answers
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Proof constant not surjective Coq

there is a function that Definition constant {X:Type} (c:X) := fun x y : X => y = c. prove that: Theorem const_not_sur : forall c:nat, ~surjective (constant c). I did: unfold not. unfold surjective....
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2 votes
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How to solve the very simple Syntax error: 'end' expected after [branches] (in [term_match]). in Coq? (in Gallina and not ltac)

I was trying to write a very simple program to sum nats in a list (copy pasted from here): Fixpoint sum (l : list nat) : nat := match l with | [] => 0 | x :: xs => x + sum xs ...
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