**0**

votes

**1**answer

9 views

### Proofs in coq using MSet

So I am still new to coq and MSets are giving me some issues. Here are two functions to compute whether an element is in a list or set, please let me know if you think the set_contains definition is ...

**0**

votes

**1**answer

23 views

### How to express subset relation in Coq?

How can I describe in Coq that one set Y is a subset of another set X?
I tested the following:
Definition subset (Y X:Set) : Prop :=
forall y:Y, y:X.
, trying to express that if an element y is ...

**2**

votes

**2**answers

27 views

### What's the square bracket syntax [ |- Set] in Coq?

I some times see this syntax in Coq to represent certain types/sets such as in printing information about existential variables:
?T : [ |- Set]
?T0 : [ x : ?T |- Set ]
I don't know how to search ...

**0**

votes

**1**answer

22 views

### Coq: Error in coercion definition

Can you fix the error:
Parameter Arg: Type.
Parameter F X XP: Arg.
Parameter Sen Phy Leg Inf: Arg -> Prop.
Parameter tree car: Phy X.
Parameter mary john: Phy XP /\ Leg XP /\ Sen XP.
Fail Coercion ...

**0**

votes

**2**answers

38 views

### Coq: coercion/subtyping between complex expressions

I've got an impression that it's impossible in Coq. For example
Parameter Arg: Type.
Parameter F X XP: Arg.
Parameter S P I PLS PI: Arg -> Type.
Parameter tree car: P X.
Parameter mary john: PLS ...

**2**

votes

**3**answers

24 views

### Coq type error when matching with type family

I’m trying to re-implement an example from CPDT from memory. I wrote:
Inductive myType : Set := MyNat | MyBool.
Definition typeDenote (t : myType) : Set :=
match t with
| MyNat => nat
| ...

**0**

votes

**1**answer

47 views

### Terms as types in Coq

Parameter R: Type.
Parameter P: R.
Parameter O: P. (*Error: The term "P" has type "R" which should be Set, Prop or Type.*)
doesn't work because terms can't have terms in Coq. How can we bypass this ...

**0**

votes

**1**answer

19 views

### What is a head in Coq head normal form?

I am having trouble understanding Coq/CIC head normal form. More specifically, I don't understand what is a head. The reference manual (8.5p1) says that
Any term can be written as:
But the ...

**3**

votes

**2**answers

17 views

### In Coq: inversion of existential quantifier with multiple variables, with one command?

I am working through a proof in which there is a hypothesis
H : exists a b v, P a b v
If I use inversion H, then I recover
a : nat
H1 : exists b v, P a b v.
which is fine, but then I need to use ...

**2**

votes

**1**answer

14 views

### Print existing setoids and morphisms in Coq

I am using the generalized rewriting features of Coq.
I would like to print the setoids and morphisms currently available to setoid_rewrite, to understand better which relation or function is missing ...

**0**

votes

**0**answers

18 views

### Saturating the proof context with a lemma

When I write tactics, I often want to saturate the proof context using a particular lemma. A typical example would be adding to the proof context all the inequalities a <= b that I can obtain by ...

**2**

votes

**1**answer

25 views

### Unfolding nested definitions in Coq

I am working with the math-classes library in Coq. This library makes a clever use of type classes to overload notations, like this.
(* From math-classes *)
Class Equiv A := equiv : relation A.
Infix ...

**2**

votes

**1**answer

20 views

### multiple successes in Coq branching and backtracking?

I am having trouble understanding the concept of multiple successes in Coq's (8.5p1, ch9.2) branching and backtracking behavior. For example, from the documentation:
Backtracking branching
We ...

**1**

vote

**1**answer

22 views

### what's the correct usage for Coq “local application of tactics”?

I'm reading Coq reference manual (8.5p1) about
Local application of tactics
Different tactics can be applied to the different goals using the
following form:
[ > expr1 | ::: | exprn ]
...

**1**

vote

**1**answer

29 views

### Coq inversion tactic that works on the goal?

I was wondering if there is an inversion-like tactic in Coq that works on the goal instead of on one of the hypotheses? That is, if there is some tactic that can invert identical constructors in ...

**1**

vote

**2**answers

40 views

### What's the difference between revert and generalize tactics in Coq?

From the Coq reference manual (8.5p1), my impression is that revert is the inverse of intro, but so is generalize to a certain extent. For example, revert and generalize dependent below seem to be the ...

**0**

votes

**0**answers

29 views

### Let expression written as inductive relation

Fixpoint subst (a:id) ( e : expression) (t : expression) : expression :=
match t with
| ( let_expression y e1 e2 ) =>
( let_expression y ([a:=e]e1) (if eq_id_dec a y then e2 else ([a:=e]...

**2**

votes

**3**answers

52 views

### Coq: a single notation for multiple constructors

Is it possible to define a single notation for multiple constructors in Coq? If the constructors differ by their argument types, they might be inferrable from them. A minimal (non-)working example:
...

**1**

vote

**2**answers

33 views

### Where is the Extensionality of predicates axiom Coq

The Coq FAQ says that the axiom:
Extensionality of predicates: ∀ P Q:A→ Prop, (∀ x, P(x) ↔ Q(x)) → P=Q
Is consistent with Coq. In what library is this asserted? It's not in Logic, as the section ...

**3**

votes

**2**answers

41 views

### What's the difference between logical (Leibniz) equality and local definition in Coq?

I am having trouble understanding the difference between an equality and a local definition. For example, when reading the documentation about the set tactic:
remember term as ident
This ...

**0**

votes

**1**answer

16 views

### How to use Coq aac tactics to prove equalities in the goal?

I am guessing that Coq aac_tactics (8.5p1) should be able to deal with assoc. and commutativity. But I can't figure out how to use it prove simple equalities such as
2 + y + 5 = 7 + y
For example:
...

**1**

vote

**1**answer

14 views

### rewrite works for integer but not for rationals for Coq aac_tactics

I was testing Coq rewrite tactics modulo associativity and commutativity (aac_tactics). The following example works for integer (Z), but generates an error when integers are replaced by rationals (Q).
...

**1**

vote

**1**answer

22 views

### where is Coq aac_tactics installed?

I was testing the AAC tactics library for rewrites modulo associativity and commutativity. According to a Coq website, one should:
Depending on your installation, either modify the following two ...

**2**

votes

**1**answer

25 views

### Coq: Unknown interpretation for negative integer expressions

Coq (8.5p1) seems to have some trouble understanding a "negative" expression such as -(x + y), as in the following example:
Require Import ZArith.
(* Open Scope Z_scope. *)
Goal (forall x:Z, x + (-x) ...

**1**

vote

**1**answer

17 views

### example for introduction pattern (p1 & … & pn) does not work

I am reading the Coq (8.5p1) reference manual,
introduction via (p1 & ... & pn) is a shortcut for introduction via
(p1,(...,(...,pn)...)); it expects the hypothesis to be a sequence of
...

**2**

votes

**2**answers

58 views

### `No more subgoals, but there are non-instantiated existential variables` in Coq proof language?

I was following (incomplete) examples in Coq 8.5p1 's reference manual in chapter 11 about the mathematical/declarative proof language. In the example below for iterated equalities (~= and =~), I got ...

**2**

votes

**1**answer

37 views

### Is one being penalized by using 'same_relation' (and possibly other library definitions)?

Given any programming language, whenever a standard library function exists, we should most likely use it rather than write our own code. One would think that this advice applies equally to Coq. ...

**2**

votes

**1**answer

61 views

### Best way to handle (sub) types of the form `{ x : nat | x >= 13 /\ x <= 19 }`?

Coq would let me define this :
Definition teenagers : Set := { x : nat | x >= 13 /\ x <= 19 }.
and also :
Variable Julia:teenagers.
but not :
Example minus_20 : forall x:teenagers, x<...

**1**

vote

**3**answers

60 views

### How do I prove 'S x > 0' from scratch in Coq?

How do I prove the simple fact
forall x:nat, S x > 0.
?
My logic is that
For any nat n, either n > 0 or n = 0.
S x = 0 leads to a contradiction.
My main problem is that I can't memorize ...

**0**

votes

**0**answers

47 views

### High-speed calculation of Coq's theorems

I have to wait until Coq finish its computations even in very simple cases.
I know about "Asynchronous and Parallel Proof Processing", but I suppose that my code has inherent vices, so I'd like to
...

**2**

votes

**2**answers

145 views

### Proof of idempotence for a function clearing a list but one element

I'm a beginner and I'm stuck with a proof with Coq about lists of nat.
I have a list reg of nat and a function clear_regs that change every values to 0 and leave the third value (index 2) unchanged.
...

**1**

vote

**1**answer

46 views

### Nested theorems in Coq

Is it possible to create a nested theorems in context of currently proving theorem?
I have a strong feeling that this feature is not fully implemented yet.
For examples,
1) I can't destruct some ...

**1**

vote

**1**answer

84 views

### How to apply Fixpoint definitions within proofs in Coq?

I have some trouble understanding how to use some of the things I've defined in Coq within proofs. I have this fragment of definition and functions:
Inductive string : Set :=
| E : string
| s : nat ...

**1**

vote

**1**answer

41 views

### Refine and @ (at) symbol in Coq 8.5pl1

In the previous version of Coq using symbol @ in refine command allows me to create a prove step-by-step. (Each argument was a separate goal.)
I want to avoid implicit arguments like "?Goal0 ?Goal1". ...

**3**

votes

**1**answer

31 views

### Inductive definition yields “Ignoring recursive call”

I have an inductive definition which—after evaluating—prints the warning "Ignoring recursive call". It seems that the definition works perfectly fine. However, I am still curious why exactly this ...

**1**

vote

**1**answer

32 views

### Show all axioms Coq

I want to see all axioms which were used by my proof.
What are the easiest ways to obtain such information?
Which commands or scripts or tools I shall use?
I am interested in either all axioms or all ...

**1**

vote

**1**answer

38 views

### Tactic to partially compute goal in Coq

I have goal
quad X Y
, but I don't remember definition of "quad" and I don't want to start searching of its definition.
Is there a tactic that allow me rapidly substitute quad with its definition?...

**3**

votes

**3**answers

40 views

### Merge duplicate cases in match Coq

I have come by this problem many times: I have a proof state in Coq that includes matches on both sides of an equality that are the same.
Is there a standard way to rewrite multiple matches into one?
...

**3**

votes

**2**answers

87 views

### Wellfounded induction in CoQ

Let's say that I know certain natural numbers are good. I know 1 is good, if n is good then 3n is, and if n is good then n+5 is, and those are only ways of constructing good numbers. It seems to me ...

**3**

votes

**2**answers

66 views

### Decomposing equality of constructors coq

Often in Coq I find myself doing the following: I have the proof goal, for example:
some_constructor a c d = some_constructor b c d
And I really only need to prove a = b because everything else is ...

**2**

votes

**1**answer

55 views

### How can I convince Coq that my function is in fact recursive?

I'm trying to write a program in Coq to parse a relatively simple context-free grammar (one type of parenthesis) and my general algorithm is for the parser to potentially return the remainder of a ...

**5**

votes

**3**answers

90 views

### From an Inductive predicate to list A -> list A -> bool

While attempting to write reusable code on an inductive predicate on lists I naturally declared:
Parameter A:Type.
Then I proceeded to define the binary predicate (for example):
Inductive prefix : ...

**3**

votes

**1**answer

33 views

### Product Type in Coq

I'm having trouble passing a parameter to a product type in coq. I have a definition that looks like,
Definition bar (a:Type) := a->Type.
I need to define a function that takes in 'a' and ...

**1**

vote

**1**answer

42 views

### Rewriting at the type level

I have the following proof state:
1 subgoals
U : Type
X : Ensemble U
Y : Ensemble U
f : U -> U
g : U -> U
pF : proof_dom_cod U X Y f
pG : proof_dom_cod U X Y g
fg : f = g
H : proof_dom_cod U X ...

**1**

vote

**1**answer

37 views

### Inductive definition for family of types

I have been struggling on this for a while now. I have an inductive type:
Definition char := nat.
Definition string := list char.
Inductive Exp : Set :=
| Lit : char -> Exp
| And : Exp -> ...

**2**

votes

**2**answers

31 views

### Weakening hypothesis without a cut

I often find myself in the following situation, where I have proven a lemma which is an implication:
Lemma L1: A -> B
where in fact the equivalence A <-> B is provable, but the implication ...

**0**

votes

**1**answer

48 views

### How to raise exception in Coq?(in match … end)

I need to define recursive definitions, but I don't no yet how to do it correctly().
So I want to have partially defined function which will say when it need additional level of recursion to be ...

**2**

votes

**4**answers

63 views

### What's the right/left inverse of a function?

In his book Software Foundations, Benjamin Pierce notes that
The function split is the right inverse of combine
where split is unzip and combine is zip. I'm wondering just what it means to be ...

**1**

vote

**1**answer

25 views

### Topological Definition of Continuous in Coq

So I'm really new to coq, functional programming altogether, and I'm trying to express the topological definition of continuity in coq. I'm using this
code to define a topology in coq. My best attempt ...

**2**

votes

**1**answer

37 views

### Port a Coq lemma over Z to a similar lemma over nat

I have a lemma that is proved for Z. All the variables are bounded to be greater that or equal to zero.
Q: How can one as easily and generally as possible "port" that lemma to nat, i.e. use that ...