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 ...

0
votes
1answer
21 views

Prevent unintentional unfolding after application in Coq

My notation has been unintentionally unfolded after application. I don't want to call the tactic 'change' on the last line in text of the tiny example every time I am using modus ponens. How to forbid ...
1
vote
1answer
17 views

Display the original name of the imported module in Coq

How to choose the textual representation of variables which belongs to some module? (Please see commentaries inside the code below. It's like Notation for modules.) I want to use it because it's ...
2
votes
1answer
78 views

Coq define a type constructor for injective functions

An injective function from type A to B maps distinct inputs to distinct outputs, but might not cover the entire range. e.g. f : ℕ -> ℕ f = λx. 2*x I'm trying to figure out how to express such a ...
0
votes
1answer
34 views

Proving a property on sets

As a Coq programming experience and following my question in here, I'd like to know if there is another proof, possibly shorter and without using Lemma subset_listpair_consver, for proving Lemma ...
0
votes
1answer
21 views

CoqIde strange message upon auto tactics

Upon using the auto or eauto item from Try Tactics CoqIde responds with the following message no matter where the current position is: Currently, the parsing api only supports parsing at the tip of ...
0
votes
1answer
49 views

Prove properties of lists

My aim is to prove that certain properties of generated lists hold. For instance, a generator function produces a list of 1s, the length of the list is given as an argument; I'd like to prove that the ...
0
votes
0answers
42 views

Substitute argument of `fix` in proof

This question is probably trivial, but I'm stuck on it since yesterday and I couldn't find the relevant keyword to search for. Consider the following: Fixpoint mfp (t: nat*nat) := fst t. Lemma ml: ...
1
vote
2answers
61 views

How to prove the inductive step in coq?

Coq beginner here, I recently went by myself through the first 7 chapters of "Logical Foundations". I am trying to create a proof by induction in Coq of ∀ n>= 3, 2n+1 < 2^n. I start with ...
0
votes
2answers
31 views

renaming part of hypothesis in Coq

After destructing n in my proof, I am stuck at the following: 1 subgoal n : nat X : Type h : X t : list X n' : nat E : n = S n' H' : length t = n' IHl : length t = n -> nth_error t n = None ...
4
votes
1answer
48 views

Recursive use of typeclass methods in Coq

Is there a way to use recursion with Coq's typeclasses? Like for e.g., in defining show for lists, if you want to call the show function for lists recursively, then you will have to use a fixpoint ...
1
vote
1answer
23 views

Proving theorems about inductive types using _ind; App rule

Variables A B : Prop. Theorem proj1 : A /\ B -> A. In order to learn, I'm trying to prove this theorem by explicitly writing down a proof term using and_ind. I would assume the correct proof ...
1
vote
1answer
25 views

How to use “field” with rationals?

Can anybody tell me why the tactic "field" does not work when I try to prove the following goal involving rationals? nat_to_Q 3 * nat_to_Q n * nat_to_Q n + nat_to_Q 3 * nat_to_Q n + nat_to_Q 3 * ...
0
votes
0answers
14 views

How to make Forward shortcut work on mac coqide?

I can't get the "Forward" shortcut to work on my MacBook. According to the IDE it should be "control + down", but that does nothing. Did someone else have this problem using coqide on a mac? Thanks....
1
vote
1answer
46 views

When are the constructors of an inductive type exhaustive?

For a simple inductive type like the natural numbers nat, it is easy to prove that the two constructors (zero and successor) give all possible natural numbers, Lemma nat_destruct (n : nat) : n = O \/ ...
0
votes
0answers
56 views

Coq to OCaml Extraction

I'm having some issues building a project. The Coq code compiles fine but when I try building the extracted OCaml code it throws this error: Error: The implementation Extraction/Extracted/Misc.ml ...
1
vote
1answer
29 views

How to put 'a is a subset of b'in coq?

I tried to implement that S is a subset of Z using Infix "⊂" := (Included Z) (at level 70). (our prof provided with this but when i try to write forall (S ⊂ Z), (insert theorem) an error message ...
0
votes
0answers
30 views

`Program Fixpoint` with mutual recursion with dependent type in Coq

In my project, I try to push more proofs to function definitions, which unavoidably adds lots of dependent types into the function definitions, and the result is I am using Program Fixpoint and define ...
0
votes
1answer
39 views

Ease life in dependently typed programming using `Function` and `Program` in Coq

I am trying to implement a dependently typed evaluator of STLC in Coq using Program Fixpoint. Since the language does not have fixed point operator, I think the evaluator should terminate, though the ...
5
votes
1answer
48 views

Why does Coq.Init.Logic define the notation “A -> B”?

The Coq Standard Library file Coq.Init.Logic, which can be found here, contains the statement Notation "A -> B" := (forall (_ : A), B) : type_scope. I don't understand how this is possible, given ...
0
votes
2answers
49 views

Reasoning about the boolean vector in Coq, based on the value of its sum. (kind of universal instantiation for vectors)

I've got stuck with theorem which is easy to formulate: "If the maximal element of the vector is 0 then each element of the vector is 0". The goal is to be able to use such an idiom as "fold_left ...
4
votes
1answer
85 views

Why we cannot pattern match on Set/Type in Coq/Agda/Idris?

Think about a function which accepts a Set, and returns its byte length, named byteLength: byteLength : Set -> Maybe Nat and if I want to implement this function directly, I need to pattern match ...
0
votes
1answer
44 views

Proving a property of Subset relation on list of pairs

I'm proving a simple mathematical property about subsets, for example : A subset B; which is about the fact that adding a member to set B cannot affect this relation. In the program, A and B are list ...
1
vote
0answers
57 views

Coq: Port a Ltac tactic using CPS style to an ML tactic (OCaml plugin)

I'm trying to port a Coq tactic (currently written in Ltac) to OCaml, in order to be able to extend that tactic more easily (and avoid the hacks I needed to emulate in Ltac some data structures that ...
1
vote
0answers
30 views

Modelling sets of cartesian products in Coq

I'm trying to model some specific sets (Ensembles) of elements that are themselves Ensembles. All the "inner" Ensembles are the cartesian products of two sets taken from some other sets of sets (W1 ...
1
vote
1answer
31 views

Path induction using eq_rect

According to Homotopy Type Theory (page 49), this is the full induction principle for equality : Definition path_induction (A : Type) (C : forall x y : A, (x = y) -> Type) (c : forall x ...
1
vote
1answer
88 views

Difference between sumbool and sum

For any A B : Prop, sum A B and sumbool A B are isomorphic, by the following, Definition from_sumbool (A B : Prop) (x : sumbool A B) : sum A B := match x with | left l => inl l | right r =&...
0
votes
2answers
46 views

How to prove decidability of a relation swaping its parameters?

I have a situation where I defined an inductive datatype t and a partial order le over it (c.f. le_refl, le_trans, and le_antisym). The order has this particularity in the le_C case, that the order of ...
1
vote
1answer
54 views

Why can IHn' (n' = n' + 0) from induction be used to prove n = n + 0 in Coq?

In Software Foundations's Logical Foundations, they use the idea of induction to prove things. From stepping through the following proof, it is difficult to see why you can rewrite what you're trying ...
3
votes
1answer
27 views

Solve Proof with Circular Symmetry in Coq

I am working on a proof using structural congruence, which is defined very similar to this example: Require Import Nat. Require Import Omega. Inductive expr := | Const : nat -> expr | Add : ...
1
vote
1answer
32 views

Proof that two isomorphic types are different

Given these two types, Inductive unit : Set := tt. Inductive otherUnit : Set := ttt. Can Coq prove they are different, ie unit <> otherUnit ? Both are singleton types in sort Set so it is not ...
0
votes
1answer
46 views

How to prove that terms of a first-order language are well-founded?

Currently, I've started working on proving theorems about first-order logic in Coq(VerifiedMathFoundations). I've proved deduction theorem, but then I got stuck with lemma 1 for theorem of correctness....
1
vote
1answer
57 views

Cardinality of Prop, Set and Type_i in Coq

Can we assign cardinals in Coq to Prop, Set and each Type_i ? I only see the definition of finite cardinals in Coq's library, so maybe we need that of big cardinals to begin with. According to the ...
1
vote
2answers
36 views

Coq: performing inversion on Prop for Set when there is only one case

Suppose I have some programming language, with a "has type" relation and a "small step" relation. Inductive type : Set := | Nat : type | Bool : type. Inductive tm : Set := | num : nat -> tm | ...
3
votes
1answer
51 views

Is it possible to force induction tactic to produce more equations?

I'm playing with inductive propositions. I have the following inductive definition: Inductive subseq {X : Type} : list X -> list X -> Prop := | empty_subseq : subseq [ ] [ ] | subseq_left_elim ...
0
votes
1answer
28 views

Use False_rec to build an aliased list type in Coq

I'd like to create a dependent function, but I am running into a type mismatch error on the False_rec term. I'm trying to do something similar to the following: Definition env A := list A. Fixpoint ...
0
votes
1answer
26 views

How to do higher-order term rewriting in Coq?

This question is based on my question https://cs.stackexchange.com/questions/96533/how-to-transform-lambda-function-to-multi-argument-lambda-function-and-how-to-re There are two functions and two ...
1
vote
1answer
29 views

Coq: matching inside Inductive definition

I'd like to implement in Coq something like the following code: Inductive IT := | c1 : IT | c2 (x:IT) (H: match x as x return Prop with | c1 => True | c2 y => False end): IT. But it is ...
3
votes
1answer
48 views

Understanding COQ proof on Show Proof.

Im new in COQ and Im trying to proof the counterexample theorem. Variable A B:Prop. Hypothesis R1: ~A->B. Hypothesis R2: ~B. Theorem ej: A. When we studied logics, we learn the RAA thechnic but ...
0
votes
1answer
22 views

Scopes in Coq - importing without resolution?

Consider the sample code: Require Import BinNat. Open Scope N. Check (N.ones). (* Error: The reference ones was not found in the current environment. *) Check (ones). How do I import BinNat in ...
1
vote
1answer
29 views

Decreasing argument with dependent types

When dealing with non-dependent types, Coq (usually) infers which argument is decreasing in a fixpoint. However, it is not the case with dependent types. For instance, consider the following example ...
2
votes
0answers
59 views

How to express `Congruence` property in a general way in Coq/Agda/Idris?

I'm working on sf/plf chapter Equiv, and it mentioned that "behavioral equivalence is also a congruence", and express this conclusion via several different Theorems, like CAss_congruence, ...
1
vote
1answer
20 views

How to make subst keep the prettiest name (minimum one in lexicographical order) in Coq?

The subst tactic is very useful in coq, it can remove useless variable names and make our context clear. But when we have a = a1 , a1 = a2 in our context, it often keeps a2 instead of a in the result,...
2
votes
1answer
16 views

Coq: local ltac definition

If there is a way to define a "local" Ltac expresion which I can use to proof a lemma but not visible outside? Lemma Foo ... Proof. Ltac ll := ... destrict t. - reflexivity. - ll. - ll....
0
votes
1answer
23 views

Subtyping using ssreflect

I have been trying to learn how to do subtyping using ssreflect, http://ssr.msr-inria.inria.fr/~jenkins/current/mathcomp.ssreflect.eqtype.html as my main reference, but have been running into problems....
7
votes
2answers
112 views

Why are the real numbers axiomatized in Coq?

I was wondering whether Coq defined the real numbers as Cauchy sequences or Dedekind cuts, so I checked Coq.Reals.Raxioms and... none of these two. The real numbers are axiomatized, along with their ...
1
vote
0answers
37 views

Ltac: repeating a tactic n times with backtracking

Suppose I have a tactic like this (taken from HaysTac), that searches for an argument to specialize a particular hypothesis with: Ltac find_specialize_in H := multimatch goal with | [ v : _ |- _ ]...
1
vote
0answers
86 views

Automatically specializing hypotheses in Coq

In proofs, if I perform induction on an argument that is not final, I get universally-quanitified induction hypotheses. I find myself repeatedly writing tactics like this: match goal with | [...
2
votes
1answer
21 views

Ltac: Matching with ltac on hypothesis which contains user defined notations

I have the following definition for an ordType and infix notations for its boolean comparison operators ==, <b and <=b. Module Order. Structure type: Type:= Pack { sort: Type; ...
1
vote
1answer
63 views

How can I prove that she cannot prove Or_commutative with only intro and apply?

This question is related to a strategic game (bargaining, protocol, crypto,...) setting I investigate during holidays where players are Coq users. Some of them have limited reasoning capabilities ...
3
votes
1answer
38 views

Prove a relation is not well-founded

Recall the definition of a well-founded relation from Coq's library : Inductive Acc (A : Set) (R : A -> A -> Prop) (x : A) : Prop := Acc_intro : (forall y : A, R y x -> Acc A R y) -> ...