Coq is an interactive theorem prover.

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3
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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/ ...
4
votes
1answer
33 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 ...
2
votes
3answers
56 views

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 ...
1
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0answers
34 views

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, ...
2
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1answer
34 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 ...
2
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1answer
46 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 ...
3
votes
1answer
37 views

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. ...
1
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1answer
34 views

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 ...
6
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2answers
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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 ...
2
votes
1answer
25 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. ...
2
votes
0answers
38 views

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 ...
3
votes
2answers
54 views

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 ...
4
votes
1answer
40 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 ...
1
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2answers
34 views

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: ...
1
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1answer
60 views

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 ...
1
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2answers
38 views

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). ...
5
votes
2answers
70 views

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 ), ...
3
votes
2answers
48 views

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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2answers
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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 ...
0
votes
1answer
50 views

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 ⇒ ...
1
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1answer
39 views

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, ...
2
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1answer
40 views

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) := ...
2
votes
1answer
29 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 ...
1
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1answer
43 views

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, ...
1
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1answer
31 views

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 ...
2
votes
1answer
83 views

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. ...
0
votes
1answer
48 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 ...
0
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1answer
39 views

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. ...
0
votes
1answer
38 views

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 ...
0
votes
2answers
48 views

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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2answers
61 views

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 : ...
0
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1answer
65 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 ...
2
votes
1answer
69 views

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)"
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votes
2answers
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Reals and theorem proving with Coq

I am just a beginner in theorem proving with Coq and I am stuck in this goal: 1 subgoal ______________________________________(1/1) ~ ((1 <= 2 - 0)%R /\ (5 <= 2 + 1 + ( 0 - 1))%R) Can ...
1
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1answer
27 views

Verify coq theorems in build script?

I'm using coq to study the meta theory of a programming language. Composing and verifying theorems interactively in the IDE is all well and good, but I need to automate (re)verification. I see the ...
-1
votes
2answers
35 views

Universally quantified modus ponens in Coq

I’m rather new to the Coq theorem prover. So I may very well have missed something fundamental when going through the tutorials. Before I ask my question, let me assume some assumptions and recap ...
12
votes
2answers
202 views

Replicating the 'Taint mode' from 'Fortify static checking tool' in Haskell

I've read some documentation of the Fortify static checking tool. One of the concepts used by this tool are called taints. Some sources, such as web requests, provide data that is tainted in one or ...
3
votes
0answers
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Calling instantiate tactic from OCaml in Coq

I am trying to develop a Coq tactic in OCaml, where I have constructed a constr term and now want to instantiate an existential variable in the goal with this term. I m trying to invoke the ...
0
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0answers
29 views

Get the result of coq

I have an automaton code in Coq, Record automaton :Type:= mk_auto { states : Set; actions :Set; initial : states; transitions : states -> actions -> list states }. ...
0
votes
2answers
34 views

coq — function power definition

I am interested in how would one define f to the n in Coq: Basically, as an exercise, I would like to write this definition and then confirm that my algorithm implements this specification. ...
0
votes
1answer
24 views

How to properly load type Int from Coq.ZArith.Int?

I'm new to coq and I am trying to use the "int" type from ZArith.Int but coq cannot find it. Require Export ZArith Int. Open Scope Int_scope. when I use "int" in my definitions such as (... -> int ...
0
votes
1answer
31 views

about the order of the elements in a set

I have the following definitions: Definition n : set string := ("a" :: "b" :: nil). Definition m : set (set string) := ("b" :: "a" :: nil) :: ("c" :: "d" :: nil) :: nil. I try to prove the ...
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0answers
51 views

Converting Coq to Idris

What would be some useful guidelines for converting Coq source to Idris (e.g. how similar are their type systems and what can be made of translating the proofs)? From what I gather, Idris' built-in ...
0
votes
2answers
51 views

Coq - (a \/ b \/ c) = ((a \/ b) \/ c)

I'm working with semirings, and in order to prove that some structures are actual semirings, I have to prove that they respect some properties, such as associativity. For the semiring (Bool, \/, /\, ...
0
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1answer
46 views

Coq — Arguments directive

I am reading Software foundations book and I came across a command that declares parameters as implicit: Arguments nil {X}. where, for example: Inductive list (X:Type) : Type := | nil : list X | ...
0
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1answer
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Reflexivity on the gt relation in Coq

I want to prove that for any natural number n+1 is greater than 0. Defining my own greater than function this works fine: Fixpoint my_gt (n : nat) (m : nat) : bool := match n with | O ...
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1answer
52 views

Pair definition in Coq has type “(Set * Set)%type” while it is expected to have type “Type”

I am reading Software Foundations(*) and have an issue with defining types in Coq: In the example below I tried to make 2 type definitions. T1 is the list of naturals, and t2 is a pair of naturals. ...
1
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2answers
54 views

Dependent pattern matching in coq

The following code (which is of course not a complete proof) tries to do pattern matching on a dependent product: Record fail : Set := mkFail { i : nat ; f : forall x, x < i -> ...
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0answers
84 views

Formalizing time and space complexity requirements

∀ a b ∈ ℕ, b ≠ 0 → ∃ ! q r ∈ ℕ, a = q × b + r ∧ r < b is a standard example of the use of dependent types. How do I extend this type so that it also expresses time and space complexity ...
0
votes
2answers
57 views

the decidable equality definitions for mutually defined inductive types

Now I have a mutually defined inductive Type a and t: Inductive a : Type := | basic : string -> (string * string) -> a | complex : string -> list a -> nat -> list t -> (string * ...