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 ...

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Reduction in coq when the simpl or cbn tactics are not effective

I am trying to prove this: Fixpoint max(a: nat)(b:nat): nat := if a <=? b then b else a. Example ex: forall n:nat, n = max n n. Proof. intros. (...) The simpl and cbn tactics do not produce ...
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Characteristic function of a union

In a constructive setting such as Coq's, I expect the proof of a disjunction A \/ B to be either a proof of A, or a proof of B. If I reformulate this on subsets of a type X, it says that if I have a ...
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65 views

Coq: Derive argument from context

(* I have a section with many variables and definitions. *) Section SectionWithDefs. Context {A B C: Type}. Variable arg1: A -> B. Variable arg2: B -> C. (* Functions that ...
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21 views

Preserving structure with inductions on 2 variables

I've been learning about Coq's tactics and familiarizing myself with the system by reproving basic facts about natural numbers. I've been trying to avoid using the theorems that are already proven in ...
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45 views

Coq tactic to sort a list?

For a proof, I want to use the fact that for any list of integers, there exists a sorted version of that list. This seems obvious to me, but I couldn't find a tactic that does something like that. I ...
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36 views

How to get coq to print out new goal and hypotheses after applying tactic

sometimes I find coq gets into a state where when I apply a tactic, the new goal and hypotheses don't automatically get printed out. How do I set it to print these out after each tactic invocation. ...
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43 views

Having trouble with inequalities with rational numbers

I'm trying to prove a that if y, a rational number, is greater than zero, then y is not equal to zero. I've identified two theorems that I think will be useful, in particular, Qlt_not_eq and QOrder....
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28 views

Coq: (a :: L1) = (b :: L2) ⇒ a = b ∧ L1 = L2?

This statement seems obvious to me, unless I'm overlooking some counterexample, but I couldn't find anything in the Coq lists library that does this. Is there a command that does something to this ...
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41 views

Hoare triple notation

The recent discussion of set notations re-motivates me to ask if anybody (Tej?) has a clever idea for getting Coq to accept a standard notation for Hoare triples -- something like this: Notation "{ P ...
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92 views

Using functions in definitions

I'm modeling a program in which users can choose from different operators and functions for writing queries (i.e. formulas) for the system. For showing these operators, here I defined add and mul ...
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34 views

Generalising a set of proofs in coq

I am trying to complete the first part lab of the 6.826 MIT course, but I am unsure about a comment above one of the exercises that says I can solve a bunch of examples using the same proof. here is ...
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Coq tactic for applying a concrete hypothesis to an existential goal

Consider the following example: Theorem example: forall (P: nat->Prop), P (1+2+3) -> (exists x, P x). Proof. intros. apply H The apply H fails with Unable to unify "P (1 + 2 + 3)" with "...
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59 views

Recursion in the calculus of construction

How to define a recursive function in the (pure) calculus of constructions? I do not see any fixpoint combinator there.
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23 views

How does one get the original keybinding for Coq?

I changed the key binding according to: https://github.com/coq/coq/wiki/Configuration-of-CoqIDE but now I can't get them back to normal. How do I them to default state? Note that Coq already ...
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48 views

Coq: unfold all Definitions

Is there a tactic for unfolding all Definitions (in the goal, optionally also in hypotheses)? Something shorter than unfold def, def0, ... in *.
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30 views

How can I give an alias to a type in coq

Let's say I wanna to create a matrix of natural numbers in coq. I have the built-in coq List, and to create a list of natural numbers, I just write list nat. In order to create a 2-dimension list (i....
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33 views

Coq forward reasoning: apply with multiple hypotheses

I have two hypothesis, and I would like to use forward reasoning to apply a theorem that uses both of them. My specific I have the hypothes H0 : a + b = c + d H1 : e + f = g + h and I want to ...
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39 views

Coding ordered sets

As for having Coq programming experience, I'd like to know if there are any other ways to code, instead of my coding, preorder relations for using them in checking a function is non-decreasing. I ...
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45 views

how to rewrite something true to True

given a goal involving ... <-> Forall P [] I want to rewrite Forall P [] to True and then rewrite True /\ Forall P ys to Forall P ys (1) there is a theorem Forall_nil saying Forall P [] but how ...
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Set theory notation with whitespaces and curly braces in Coq

I'd like to have standard notation like "x ∈ { x }" in Coq. But there are problems: 1) Curly braces has special meaning in Coq, so the following happens: Notation " x ∈ y " :=(tin x y) (at level 50)....
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23 views

Coq: Sublists of sorted lists are also sorted?

I am trying to prove that if a list (L1 ++ a :: L2) that is StronglySorted by "less than or equal to" means that the list (L1 ++ L2) is also sorted (since it's just a sorted list minus an element). So ...
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31 views

Converging sequence to least upper bound

Given a non-empty subset of the real numbers E : R -> Prop, the completeness axiom gives a least upper bound l of E. Is there a constructive function lub_approx_seq (E : R -> Prop) (l : R) : ...
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Development of the Coq library. (Add LoadPath solution is not good enough.)

I am adding some theorems to the library https://github.com/coq-contribs/zfc But there is a not very good thing. While I developing the code in the CoqIDE I have to add Add LoadPath "/home/user/0my/...
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27 views

Using the same proof for two subgoals in Coq

After an induction on an inductive type, I have two subgoals to prove. The hypotheses and goals are slightly different but can be solved by the same (long) proof, which currently looks likes this: ...
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26 views

Coq extending judgemental equality on Ensemble

I am stuck with proving something like this Theorem EqualContainIn (A: Type) (x: Ensemble A) (y: Ensemble A) (X: Ensemble (Ensemble A)) : forall eq: (Same_set A x y), (X x) -> (X y). In essence ...
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37 views

Remove All Double Negations in Coq

I would like to systematically remove all double negations which can appear in my hypotheses and goals. I know that ~~A -> Ais not a part of intuitionist logic, but the course I am taking is ...
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30 views

Coq unification on record params

I have defined topology space like this, Require Export Ensembles. Arguments Full_set {U}. Arguments Empty_set {U}. Arguments In {U}. Arguments Intersection {U}. Arguments Union {U}. Arguments ...
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31 views

Coq: Proving proposition f (x y) -> f y

Is it possible to prove Lemma A3 (f x: Prop -> Prop)(y: Prop): f (x y) -> f y. either w/ or (preferably) w/out axioms?
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Defining equality relation for infinite trees

In coq i can define equality relations for coinductive types whose components are pairs: Section Pairs. Variable (A:Type). CoInductive Stream := cons : (A * Stream) -> Stream. CoInductive ...
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19 views

Is “printf-debugging” possible in Ltac?

Is there a way to print the value of a variable (whether a hypothesis, tactic, term) in the middle of an Ltac procedure?
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47 views

Finite list with unknown size

I'm a bit confused trying to define some structures using the math-comp library. I want to define a structure that has a function ranging from a set of values and returning lists of other values. I'm ...
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32 views

Disjunction Commutavity in Coq

I would like to have an Ltac tactic which does the work of Disjunction Commutavity. Mainly, if I have a subterm P \/ Q somewhere in a hypothesis H, Ltac Com H will add Q \/ Pas another hypothesis to ...
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Splitting a premise with conjunction conclusion in Coq

I often have to do "induction loading" to prove goals in Coq, where I prove multiple things simultaneously by induction. The problem is, I often end up with Inductive Hypotheses of the following form:...
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Modus Ponens and Modus Tollens in Coq

I would like to have Ltac tactics for these simple inference rules. In Modus Ponens, if I have H:P->Qand H1:P, Ltac mp H H1 will add Qto the context as H2 : Q. In Modus Tollens, if I have H:P->...
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70 views

Conditional Proof Tactic in Coq

I believe the title is pretty self explanatory : https://en.wikipedia.org/wiki/Conditional_proof I would like to have a tactic where I assume a proposition and proceed to find another one, if ...
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27 views

Pattern-matching a hypothesis obtained from a pattern-match on goal

Consider the following development: Definition done {T : Type} (x : T) := True. Goal Test. pose 1 as n. assert (done n) by constructor. Fail ltac:( match goal with | [ H : done _ |- _ ...
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Disjunctive Syllogism tactic in Coq?

I am learning propositional logic and the rules of inference. The Disjunctive Syllogism rule states that if we have in our premises (P or Q), and also (not P); then we can reach Q. I can not for the ...
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Equality of finite maps in coq (defined using map2)

Suppose I want to define a type of Monomials in Coq. These would be finite maps from some ordered set of variables to nat where, say, x²y³ is represented by the map that sends x to 2, y to 3 and where ...
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Definitional vs propositional equality in Coq lemma statements

When writing highly automated proofs in Coq (CPDT-style) proofs, building on extensive use of eauto N, I must often modify my lemma statements to allow eauto to use them easily. In particular, I must ...
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Coq - How to proof False when hypotesis is wrong

I made an environment to try to proof what I want/need I have a posfijo function that says if a list (l1) contains another list (l2) at the end. So if I add an element to the first list and I use ...
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setoid_rewrite with impl doesn't work with lemmas of type `A -> B`

Example: Require Import Basics. Require Export Setoid. Require Export Relation_Definitions. Set Implicit Arguments. Lemma simple1 (A B : Prop) (f : A -> B) (x : A) : B. Proof. assert (f2: impl ...
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What is the origin of the names of I and tt?

The Coq standard library has two unit type. One True is typed in Prop, and has a single constructor I : True. The other unit is typed in Set, and has a single constructor tt : unit. I wonder what is ...
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35 views

Automatically dispatching single-case inductive types

I'm trying to learn how to do Coq proof automation à la Chlipala/crush. To this end I wonder what's a convenient approach for automatically breaking down single-case inductive types, for example when ...
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27 views

Can the injection tactic modify the end goal, or add extraneous assumptions?

Consider the following development, an isolated part of Adam Chlipala's simplHyp: (** Fail if H is in context *) Ltac notInCtx H := assert H; [ assumption | fail 1 ] || idtac. Ltac injectionInCtx := ...
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Why does Adam Chlipala use left-associated nested tuples to represent Ltac lists in CPDT?

Via CpdtTactics.v: [...] Succeed iff x is in the list ls, represented with left-associated nested tuples. Ltac inList x ls := match ls with | x => idtac | (_, x) => idtac | ...
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Unable to find an instance for the variable x, even with explicit instantiation

I'm currently working through the Logical Foundations book and I'm stuck on the last part of Exercise: 4 stars, advanced (subsequence) (subseq_trans). Here is my definition for subseq: Inductive ...
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38 views

How to customize colors for Command and Tactic in ProofGeneral when using Coq in Emacs?

I want to color some specific command and tactic into different color, e.g. I want "Print" and "Locate" command to be gray, and "induction" to be some special color different from other tactics. Is ...
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67 views

How to define this dependently-typed tree structure in Coq?

I’d like to define a rather simple kind of tree, but I’m not sure how to do it. First, define a standard binary tree with natural number values, except we disallow empty trees: Inductive nat_btree : ...
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53 views

Coq: How to refer to the types generated by a specific constructor?

For example, if I define a function from nat to nat, it would be Definition plusfive(a:nat): nat := a + 5. However, I would like to define a function whose arguments are nats constructed using the "...
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72 views

Coq: Rewriting with 'forall' in hypothesis or goal

I have proved 'correctness' of the reverse function on polymorphic Lists in Coq. The following proof works just fine, but I have a few questions about how the rewrite tactic works. Here's the code: ...