Coq is an interactive theorem prover.

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Single-quote notation for characters in Coq?

In most programming languages, 'c' is a character and "c" is a string of length 1. But Coq (according to its standard ascii and string library) uses "c" as the notation for both, which requires ...
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Import notation from module signature in implementing module

How can I make the notations defined in Category available in HomCategory? Module Type Category. Parameter Object : Type. Parameter Arrow : Object -> Object -> Type. Infix "~>" := ...
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Combinatory logic library for proof assistants?

I'm working through some intro-level combinatory logic exercises using Coq. I've written a crude library for it, but it isn't very efficient. Is there a combinatory logic library for Coq or other ...
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35 views

Coq dependent types

I am new to Coq and need some help with some of trivial examples to get me started. In particular I am interested in defining some operations of vectors (fixed size lists) using dependent types. I ...
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Find the definition and notations like ++ in Coq

How can we get the definition/type for those notations like "+", or "++" of List? I have tried : Search ++,Search "++", Search (++), SearchAbout ... and Check ++, Check "++", Check(++) None of ...
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Using an hypothesis to remove cases in a match statement

I would like to use an hypothesis in a function to rule out some of the cases in a match statement. I wonder how this is done in Coq. A very simple example is a function that uses match on a nat. I ...
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36 views

Best way to instantiate nested existential statement in Coq

Suppose I have a nested existential statement H : exists ( a : A ) ( b : B ) ( c : C ) ... ( z : Z ), P a b c ... z in the context. What is the best way instantiate H and obtain a new hypothesis H' : ...
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How to formalize the definition of likeness/similarity between relations in Coq?

I am reading the book Introduction to Mathematics Philosophy by B.Russell and trying to formalize the definitions. Whereas I got stuck on proving the equivalence between the two definitions of ...
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Best way to perform universal instantiation in Coq

Suppose I have an hypothesis H : forall ( x : X ), P x and a variable x : X in the context. I want to perform universal instantiation and obtain a new hypothesis H' : P x. What is the most painless ...
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36 views

OCaml string and Coq string (Extraction from Coq to OCaml)

I used the extraction from Coq to OCaml, where I have type Z, N, positive I don't use to extract it in int of OCaml. Then the type I have after the extraction is: type positive = | Coq_xI of ...
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The extraction of coq type nat into which type of ocaml so that I can have a certified program

In Coq, the extraction from type nat into int or big_int are not certified (they are efficient). As in these links below: http://coq.inria.fr/V8.3/stdlib/Coq.extraction.ExtrOcamlNatBigInt.html and ...
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Convert ~exists to forall in hypothesis

I'm stuck in situation where I have hypothesis ~ (exists k, k <= n+1 /\ f k = f (n+2)) and wish to convert it into equivalent (I hope so) hypothesis forall k, k <= n+1 -> f k <> f ...
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40 views

What is the difference between “Qed” and “Defined”?

In the interactive theorem prover Coq, any interactive proof or definition can be terminated with either Qed or Defined. There is some concept of "opacity" which Qed enforces but Defined does not. ...
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How to describe the one-many relations in Coq?

I was reading the book Introduction to Mathematical Philosophy by B.Russell and trying to formalize all the theorems described in it. One-many relations are described by the following text (contexts ...
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43 views

Describing a recursive type in Coq

I want to define type that abstracts a human individual with following rules: A human is either male or female A human has a spouse with the different sex to themselves, and their spouse's spouse ...
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51 views

Parameterizing a proposition over other parameterized propositions of unknown arity in Coq

I want to define a parameterized proposition decidable that talks about the decidability of other parameterized propositions. To take a common example, even is a parameterized proposition that takes 1 ...
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How to prove a goal from contradictory hypotheses?

I have hypotheses i <= 0 and i >= 2 in my context. How can I prove my goal? are there tactics for this?
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File I/O in Coq via ynot

Does anyone have a small working snippet of code to read strings from a file in Coq (the ynot library seems to do this, but I can't figure it out)? Ynot can be found here: http://ynot.cs.harvard.edu/ ...
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42 views

Compile coq without the standard library

I am compiling Coq often to test some changes, but this process is really slow because the standard library in theories/ takes time to compile. Is it possible to generate a "lightweight" version of ...
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What is the exactly the term “10” in Coq?

A very basic question about Coq (with Init libraries): the term 10 is of type nat, and the type nat is defined inductively: Inductive nat : Set := | O : nat | S : nat -> nat. Q1. But is "10" ...
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Specifying coqtop path for CoqIDE Vim plugin on Windows 8.1

I am trying to make the CoqIDE Vim plugin work on Windows 8.1. When I source the plugin from Vim, I get this error message: coqtop.opt: command not found. So I looked up the plugin documentation, ...
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42 views

Inversion on symmetrical relation becomes circular in Coq

One possible way to say that n m : nat are adjacent even numbers in Coq is to define that relation inductively, beginning with 0 and 2. Inductive adj_ev : nat -> nat -> Prop := | ae_0 : adj_ev ...
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73 views

Simple graph theory proofs using Coq

Is there a well established Coq graph library for proving simple theorems ? I would like to learn how to prove simple stuff like: "G1, G2 are isomorphic if and only if their complements are ...
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Inversion produces unexpected existT in Coq

Here is an inductive type pc that I am using in a mathematical theorem. Inductive pc ( n : nat ) : Type := | pcs : forall ( m : nat ), m < n -> pc n | pcm : pc n -> pc n -> pc n. ...
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Coq proof of forall a b c: nat, b >= c -> a + b - c = a + (b - c)

Does anybody know of a proof in any of the standard libraries of Coq of the following theorem? If there is one, I couldn´t find it. forall a b c: nat, b >= c -> a + b - c = a + (b - c) Thanks in ...
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Difference between type parameters and indices?

I am new to dependent types and am confused about the difference between the two. It seems people usually say a type is parameterized by another type and indexed by some value. But isn't there no ...
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45 views

Coq tactic for record equality?

In Coq, when attempting to prove equality of records, is there a tactic that will decompose that into equality of all of its fields? For example, Record R := {x:nat;y:nat}. Variables a b c d : nat. ...
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Generalize code matching on constructors of types

I'm working in the HoTT universe, so discriminate isn't available (yet!) For each pair of constructors, I can construct a theorem using transport and type families, but I don't know how to generalize ...
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Using remember in induction over proposition gives 'ill-typed' error in Coq

Here are the inductive & computational definitions of evenness of natural numbers. Inductive ev : nat -> Prop := | ev_0 : ev O | ev_SS : forall n:nat, ev n -> ev (S (S n)). Definition ...
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50 views

How to end this Proof in Coq

I have managed to reduce my goal to (fun x0 : PSR => me (x x0)) = x I know that reflexivity will work, but for pedagogical reasons I prefer to continue reducing it. me is an identity function ...
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Proof of Paper, Scissor, Rock as Monoid Instance in Coq

So while learning Coq I did a simple example with the game paper, scissor, rock. I defined a data type. Inductive PSR : Set := paper | scissor | rock. And three functions: Definition me (elem: ...
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Differences between Coq and Agda

What are each of these programs designed for and what does each offer other the other? Also, are both systems consistent, and moreover, are they based on some foundational mathematical theory? Two ...
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How to create a new hypothesis from apply?

When I run the Coq script below (a simplification of the original one): Inductive w (g: nat): nat -> Prop:= | z: w g 0. Lemma x: forall (i j: nat), w i j -> (forall k: nat, k <= k). ...
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Proving that a reversible list is a palindrome in Coq

Here is my inductive definition of palindromes: Inductive pal { X : Type } : list X -> Prop := | pal0 : pal [] | pal1 : forall ( x : X ), pal [x] | pal2 : forall ( x : X ) ( l : list X ), ...
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How to unfold a recursive function just once in Coq

Here is a recursive function all_zero that checks whether all members of a list of natural numbers are zero: Require Import Lists.List. Require Import Basics. Fixpoint all_zero ( l : list nat ) : ...
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Default implementations in coq’s Modules

I have an interface that I want to implement several times: Module Type I. Parameter a : A. Parameter b : B. Parameter c : C. End I. (and assume that each of a, b and c are actually many ...
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explain a simple operation in coq

I have the following code, Here O is the charater O not zero 0 Module Playground1. Inductive nat : Type := | O : nat | S : nat → nat. Definition pred (n : nat) : nat := match n with | O ⇒ ...
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Powerset and ensembles in Coq

I have the following definition for a monoid Class Monoid (K : Type) (op : K -> K -> K) (unit : K) := { (* few properties here *) }. that I can easily instanciate, for exemple, ...
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Coq: unfolding class instances

How do I unfold class instances in Coq? It seems to be possible only when the instance doesn't include a proof, or something. Consider this: Class C1 (t:Type) := {v1:t}. Class C2 (t:Type) := ...
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38 views

Coq auto-simplification similar to Isabelle?

In Isabelle, it's possible to mark facts (such as theorems) of the form P=Q with the "simp" attribute. Then when proving things, the "simp" and "auto" tactics will use such facts to convert ...
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Leibniz property in Coq

I have this definition of equality on natural numbers : Fixpoint equal_nat (n m : nat) : bool := match n, m with | O, O => true | O, S _ => false | S _, O => false | S n1, ...
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Elim a double negation hypothesis in Coq Proof Assistant?

Could anyone explain to me why do we have to prove ~A after elim Ha.? Before "elim Ha" 1 subgoals A : Prop Ha : ~ ~ A ______________________________________(1/1) A After 1 subgoals A : Prop ...
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a + b = 0 -> a = 0 and b = 0 in Coq

I want to prove the following : 1 subgoals a : nat b : nat H0 : a + b = 0 ______________________________________(1/1) a = 0 /\ b = 0 It seems very easy, even trivial, but I dont know how to do it. ...
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52 views

Indicator function and semirings in COQ

I'm quite new with Coq, and I'm trying to define a "generic" indicator function, like this : Function indicator (x : nat) : bool := match x with | O => false | _ => true end. This ...
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Datatype.nat versus nat?

The problem is I declared an inductive function in Coq and want to test it. But I’m having an error with my Check line which is: Inductive natprod : Type := pair : nat -> nat -> natprod. ...
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applying a function with different field

Is there a way, to apply an hypotesis to our goal in Coq ? For example: Hypothesis: 1 subgoal a : nat l1 : list nat l2 : list nat H : Prefix (a :: l1) l2 IHl1 : Prefix l1 l2 -> sum l1 <= sum ...
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Elim versus induction

I would like to understand the use of "elim" and "induction" on Coq... Why ? Because i have been tried to do some exercises and didn't not understand why i must use sometimes the "elim" and other ...
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Implementing safe element retrieval by index from list in Coq

I'm trying to demonstrate the difference in code generation between Coq Extraction mechanism and MAlonzo compiler in Agda. I came up with this simple example in Agda: data Nat : Set where zero : ...
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96 views

Cannot load CoqIDE plugin for vim

I'm trying to use the CoqIDE for vim plugin I found on this page. I put the coq_IDE.vim file in ~/.vim/ftplugin folder. My current .vimrc file is: set showcmd set number imap hl <Esc> filetype ...
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Can we design inference rules about separation logic in Z3 and use it to proof some props automatically?

Can we design inference rules and axioms about separation logic in z3 and use it to proof some props automatically? For example," x=y /\ (x |-> z) |- x=y /\ (y |-> z)"