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.
I am passing Logical Foundations course and became stuck upon the last excersize of Basics:
Having binary number write a converter to it's unary representation:
Inductive bin : Type :=
| A (...
I want to define minimum and maximum of group by following code, but it has a problem. Plz guide me.
Definition groupmin (sn maxlimit maxsn: nat) : nat :=
let avg := div maxlimit maxsn in
I am trying to prove the following simple theorem over natural numbers:
((i + j) = (i + k)) -> (j = k)
Here is what I have in Coq:
Theorem cancel : forall (i j k : nat),
((add i j) = (add i k))...
I am a little confused whether the injectivity of the successor function defined on natural numbers in Coq is an axiom? According to Wikipedia/Peano axioms, it is an axiom (7). When I look at Coq.Init....
I am trying to prove the following trivial cancellation theorem for natural numbers:
forall i, j, k in nat . ((i+j) = (i+k)) -> (j = k)
Here is what I wrote in Coq:
Theorem cancel : forall (i j ...
I have two hypotheses in context, but when I try to apply one to another, I get the error unable to unify. I should be able to unify them. The two hypotheses are as follo
IHl : forallb func l = true -...
I finished writing a somewhat lengthy proof, but whenever I try Qed I get the error message Error: This proof is focused, but cannot be unfocused this way. Are there any other ways to unfocus the ...
I have two lists in coq.I want to find the difference between these two lists.Plz guide me in writing code in coq
I have a pretty basic expression involving real number literals and +, namely the fact that 4 = 1 + 1 + 1 + 1.
I'm trying to figure out how to prove this fact using as little cleverness as possible.
Using the CoqIde, is there a way to view the steps simpl has taken? I find I do not understand how it achieved its result quite often.
rev (rev (n :: l')) = n :: l'
-- apply simpl.
With Coq's axioms of real numbers completeness and total_order_T, using the same technique as in the standard lib lemma Un_cv_crit_lub, I managed to prove
Lemma NatForallDec : forall (f : nat -> ...
I got the same error as from this question: Coqide Error: Compiled library Basics.vo makes inconsistent assumptions over library
Compiled library my_bool (in file /Users/Satan/lf_Satan/my_bool....
My goal is like below. Are there any tactics to solve these trivial goals?
Goal forall A (x : A) P Q,
(forall y, P y /\ Q y) ->
intros. intuition. auto.
(* a more complex ...
Assume I have an existential proposition P about the natural numbers, for example
Definition P (n : nat) : Prop
:= exists k:nat, True.
Assume also that I have proved P for all numbers,
Lemma allP :...
I'm curious about the type of the Coq entities equivalent to connectives in logic. For the sake of specificity, let's say -> and /\. If -> is a magical non-[first-class entity], then let's just ...
I find a pattern inside my goal through a tactic.
Why does this fail:
Tactic Notation "my_context_match" uconstr(g) :=
match goal with
| |- context[g] => idtac
By accident, I found that one can make the following definition in Coq:
Definition x := Type : Type.
What does Type : Type mean? What are some use cases for such definition?
I was trying to go through the famous and wonderful software foundations book but I got to an example where simpl. and reflexivity. just do to much under the covers and are hindering my learning & ...
I'm trying to see if it's possible to prove evenb n = true <-> exists k, n = double k from https://softwarefoundations.cis.upenn.edu/lf-current/Logic.html without involving odd numbers at all. I ...
I am passing through coq course "Logical Foundations". Solving problem:
Having less or equal function:
Fixpoint leb (n m : nat) : bool :=
match n with
| O => true
| S n' =>
match m ...
Is there a way to extract an abstractions defined in Coq and link it with C++ code?
For example, I want to define a Type named EvenNum, which represents all the even natural numbers. Is there any ...
I have the following in my proof environment:
a, b : nat
H : (fix loop (m : nat) : nat :=
match (m - a) with
| 0 => m
| S m' => loop m'
end) b = 0
G : (b - ...
I was trying to install tcoq and gamepad as described here but had the errors:
/Library/Developer/CommandLineTools/usr/bin/make --warn-undefined-variable --no-builtin-rules -f Makefile.build
I was trying to install tcoq and I had the following error:
"/Users/pinocchio/.opam/4.05.0/bin/ocamlfind" ocamlc -rectypes -w -3-52-56 -c grammar/compat5.ml
OCAMLC -c -pp grammar/gramCompat.mlp
I have already proved the following lemma:
Lemma ord_semiconnex_bool : forall (alpha beta : ord),
ord_ltb alpha beta = true \/ ord_ltb beta alpha = true \/ ord_eqb alpha beta = true.
I would like ...
I am working through the book "Software Foundations", and am on the last problem in Chapter two. The problem asks to convert a natural number into a binary number, where a binary number is defined in ...
I want to prove two Lemmas in coq to be useful for further proofs. I have already thought these for several hours (>= 4 hours). I want to get some hints or partial or complete proofs about lemmas ...
I wanted to see a few hands on examples of Coq proofs of the form:
essentially where the Goal had an existential quantifier. I was having issues manipulating the goal in ...
I was trying to define the configuration that help a statement/code/program/arithmetic/bool expression, but I found myself having to define one for each type which seems unnecessary. Is it possible to ...
I have imported a Coq module which defines a coercion, but it does not fit my needs. Is there any way to remove or (locally) override it?
To be specific, say the module I imported defines a coercion
What does the with keyword without the match do inside a inductive type in Coq?, example:
Inductive Block : Type :=
| EmptyBlk : Block
| Blk : Statement -> Block
with Statement : Type :=
Is there an equivalent of the uniqueness of identity proofs, for types with a decidable order ? In particular, in the type of Peano natural numbers ? Is it implemented somewhere in Coq's library ? (I ...
I wanted to divide two numbers in Coq because I was trying to implement my own custom Imp language and had a statement:
match (aeval st a1) with
| Some n0 => Some (NDiv n0 (S n))
I defined an inductive type, minimal example below. I would like to use notations, like ~ or =. The syntax is recognized, but not printed in the goals of the top right panel.
Inductive num :...
I am running CoqIDE to use read the textbook series "Software Foundations", I am currently reading the volume "Logical Foundations". I just started Chapter 2 (Induction), but when I try to run the ...
I was trying to define a function using Program Fixpoint, which uses another (anonymous) recursive function in its body. I tried using Admit Obligationsfor the moment, to see if something else made ...
I was going through the Imp tutorial and found I couldn't even compile the code software foundations provided:
Coercion AId : string >-> aexp.
Coercion ANum : nat >-> aexp.
I was looking at IndProp and I saw:
Fail Inductive wrong_ev (n : nat) : Prop :=
| wrong_ev_0 : wrong_ev 0
| wrong_ev_SS : ∀ n, wrong_ev n → wrong_ev (S (S n)).
(* ===> Error: A parameter of an ...
I was going through IndProp in software foundations and Adam Chlipala's chapter 4 book and I was having difficulties understanding inductive propositions.
For the sake of a running example, lets use:...
I was going through Adam Chlipala's book on Coq and it defined the inductive type:
Inductive unit : Set :=
I was trying to understand its induction principle:
There is this one exercise in "Software Foundations" that I've been trying to solve correctly for some time now but I've actually hit a wall in terms of trying to write down the function being asked ...
I was going through the software foundations course and saw the following simple code:
Inductive ev : nat -> Prop :=
| ev_0 : ev 0
| ev_SS : forall n : nat, ev n -> ev (S (S n)).
however, when ...
I was looking at:
Inductive aevalR : aexp -> nat -> Prop :=
| E_ANum : forall (n: nat),
aevalR (ANum n) n
| E_APlus : forall (e1 e2: aexp) (n1 n2: nat),
aevalR e1 n1 ->
I know that repeat applies a tactical multiple times until it fails.
The repeat tactical takes another tactic and keeps applying this tactic until it fails.
and the try tactic does nothing when ...
I was going through software foundations and got the example:
repeat (try (left; reflexivity); right).
and was confused what this meant. For example do we get:
try [ (left; reflexivity); right ]
This question is a request for references or explanation.
The main idea is: What if I add every axiom from standard library of Coq?
Will it raise a contradiction or they are well-adjusted to each ...
I'm learning Ssreflect and I wish to know how to solve this situation. My idea is to define a graph (as a Record), and then generate another graph. Below, I show a piece of code (which I extracted ...
The tactic instantiate can take and ident or a num as:
instantiate (ident:= term)
instantiate (num := term)
Now I want to use the second one inside a tactic definition. For example:
I'm trying to proof something in CoqIDE (for school). I'm blocking on a step, here is the
`Print length. (* la longueur de listes *)
Lemma mystere A: forall l : list A, length l = 0 <-> l = ...
I wanted to develop some Coq code in Atom. I wanted to be able to check my code line by line as usual just like with CoqIDE or emacs proof general. Is there something like that for atom or how do ...