Isabelle is a generic proof assistant, with Isabelle/HOL as main instance.

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Double function in Isabelle

I try to learn Isabelle/HOL by working through this tutorial. I have a problem with the exercise about the double function. I defined it like this: fun double :: "nat ⇒ nat" where "double 0 = add 0 ...
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Proving topology statement in Isabelle

I have been working with limits and topology in and I want to prove the following lemma: lemma fixes f g :: "real ⇒ real" assumes "open S" "∀a b. a < b <--> f a < f b" "∀a. (f a)>0" ...
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Proving a simple arithmetic statement with rewriting in Isabelle

I am trying to prove a big case distinction in Isabelle for some (conceptually) simple arithmetic statement. During the proof, I stumbled upon the following subgoal. ⋀d l k. 0 < d ⟹ ¬ 2 ...
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Is there an include-like command for 'struct', similar to 'include' for 'sig'?

This question is related to how sectioning and Sidekick can be used with Isabelle/ML in Isabelle/jEdit. Consider two Isar commands, section and ML. These commands act as sectioning commands in the ...
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Trying to define custom 'declare' & 'using' commands

I figure out how to modify some Isar and ML, but here I don't know how to get what I want. I use declare and using to turn info on and off, like with these (and other longer combinations): ...
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Substitution in Isabelle

In many paper proofs you see authors substitute variables in equations. For example, if there is an inequality "f(x-y) >= g(x-y)*z, the author simply writes let h=(x-y), therefore "f(h) >= g(h)*z" and ...
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De Bruijn indices in Isabelle and Coq

I would like to be able use something like de Bruijn indices in Isabelle or in Coq, in order to refer to variables that have been introduced by quantifiers. For example, instead of writing: forall x. ...
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Ignoring a case to prove a goal through elimination

I have the following lemma to show the derivative of f at x is D. lemma lm1: assumes "(∀h. (f (x + h) - f x) = D*h)" shows "DERIV f x :> D" proof cases assume notzero: "∀h. h ≠ 0" have cs1: ...
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Create a quotient-lifted type with polymorphism over working set and equivalence relation in Isabelle/HOL

I would like to create a quotient type with quotient_type in Isabelle/HOL in which I would left "non-constructed" the non-empty set S and the equivalence relation ≡. The goal is for me to derive ...
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30 views

Function definition with index/subscripts

I am trying to define the function: Fi(xi) = real However I am finding it hard to implement subscripts into my function. The subscript i has to be a natural number, whereas x is a real number, and ...
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What's the difference between “arith” and “presburger” in Isabelle?

Every goal that I have encountered in Isabelle so far that could be solved using arith could also be solved by presburger and vice versa, for example lemma "odd (n::nat) ⟹ Suc (2 * (n div 2)) = n" by ...
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Converting a set to a list in Isabelle

How can I convert a set to a list in Isabelle? I am interested in a function definition, with the signature: "'a set => 'a list" How can I define this?
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Declaring a coercion from a record type

I have a record type record foo = main_stuff :: "nat list" other_stuff :: "int" If f has type foo, I would like to be able to have f automatically coerced to the nat list in the main_stuff ...
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59 views

Customize proof-general's dark theme for Isabelle

I'm a novice in both Isabelle and Proof General. I am trying to set a dark theme in Proof General to use with Isabelle, but no matter what theme I choose (e.g. tango-dark, ample, monokai, etc.), the ...
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Isabelle solvers: “auto” or “fastforce”? (comparison of solver strength)

In Isabelle, I often find that I can prove a goal successfully using different solvers. Generally I would prefer to use the weakest solver that can just about prove the goal. Based on my experience ...
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31 views

Proving integration within a set

I am attempting to use the fundamental theorem of calculus to prove the lemma lm1: lemma lm1: fixes f :: "real ⇒ real" assumes "∀x∈{a..b}. (f has_vector_derivative f' x) (at x within {a .. b})" ...
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Inductive predicate with type parameters in Isabelle

I started learning Isabelle and wanted to try defining a monoid in Isabelle but don't know how. In Coq, I would do something like this: Inductive monoid (τ : Type) (op: τ -> τ -> τ) (i: τ): ...
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Isabelle: understanding the use of quantifiers

I have found that I can prove the following lemma, which seems false to me. lemma assumes "∀a b. f a > f b ∧ a ≠ b" shows "∀a b. f b > f a" using assms by auto How can the lemma above be ...
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46 views

Isabelle 'fun' without 'where'?

Isabelle doesn't let me write just fun f :: "nat list => nat"; I have to add at least one defining equation, e.g. where "f [] = 5". But since it's fine to leave some constructors undefined, why ...
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Interpretation of Partial Functions from Z to Isabelle/HOL

I am trying to write a predicate such that, "if a certain constant is true"(in this case if 'sec=ok') then the predicate will evaluate to False, because I've written an expression in the consequent of ...
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Apply lemmas to bound variables

I can prove the following lemma: lemma lem1: assumes "(a::real) ≤ b / c" and "c > 0" shows "a * c ≤ b" using assms using pos_le_divide_eq[of "c" "a" "b"] by auto however, if I use bound ...
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37 views

Skip a subgoal while proving in Isabelle

I am trying to prove a theorem but got stuck at a subgoal (that I prefer to skip and prove later). How can I skip this and prove the others ? First, I tried oops and sorry but they both abort the ...
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Isabelle type unification/inference error

I'm just getting started in Isabelle and I'm getting a type unification error while working through Exercise 3.3 in of Concrete Semantics: Define a substitution function subst :: vname ⇒ aexp ⇒ ...
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Converting free variables to bound variables

I want to prove the following lemma lemma assumes "f (w+n) - f w / n ≤ g (w+n)" shows "∀n. (f (w+n) - f w) / n ≤ g (w+n)" I assumed this would be very simple however it is proving trickier than I ...
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need a definition in Isabelle to show that two partial functions never produce the same output

I'm using the mathematical toolkit in HOL-Z to discharge some Isabelle predicates. specifically I'm using the partial function definition to define some of the relations in a Z specification that I'm ...
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Substituting for the lambda expression in Isabelle

Given the function f: definition f :: "real => real" where "f x = x" I can show that as n tends to 0, f(x+n) tends to f(x) by the following lemma lemma "(λn. f(x+n)) -- 0 --> f x" unfolding ...
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Apply simplifier to arbitrary term

I have a term in mind, say "foo 1 2 a b", and I'd like to know if Isabelle can simplify it for me. I'd like to write something like simplify "foo 1 2 a b" and have the simplified term printed in ...
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35 views

Working with generic definitions in Isabelle

I am working with limits and I am unable to prove the following definition func :: "real ⇒ real" where "func = real" lemma "(λh. (func (x+h))) -- 0 --> (func (x))" unfolding func_def apply (auto ...
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Why must Isabelle functions have at least one argument?

When I try to write fun foo :: "nat ⇒ nat" where "foo = Suc" Isabelle complains that "Function has no arguments". Why is this? What's wrong with a fun having no arguments? I know that I can ...
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Is there a reference definition of higher-order logic as in HOL, Isabelle, etc?

I am reading "Concrete semantics with Isabelle/HOL" and I am getting very intrigued by higher-order logic. I know ordinary first-order logic and some modal logic but I have little if none previous ...
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Are there other HOL programming languages besides Caledon that are based on haskell?

There are programming languages and theorem prover based on higher order logic (HOL). Examples include Twelf, lambda prolog, Isabelle. For example Twelf is is both a programming language and a theorem ...
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completely replace the inner syntax in isar?

I am interested in using Isar as a meta language for writing formal proofs about J, an executable math notation and programming language, and I'd like to be able to use J as the inner syntax. J ...
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Expressing a simple declarative proof about exponents in Isar

I'm attempting to write a simple proof about integer exponents in isar. I've written the argument I want to make in the commented area, but I'm having a very hard time figuring out how to express it. ...
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How to make Isabelle use ZF?

What's the trick to making Isabelle find src/ZF/Main.thy instead of src/HOL/Main.thy? None of the ZF examples work if I just load them into the IDE, but it looks like that's because it doesn't know ...
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Applying lemma to solve goal

I am trying to prove the following lemma using the theorem lemma lm22: fixes f :: "real ⇒ 'a::banach" assumes "a ≤ b" and "∀x∈{a .. b}. (f has_vector_derivative f' x) (at x within {a .. b} shows "(f' ...
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How to get the value of a const with ML code in Isabelle?

I wrote a definition in my theory, say: definition mycmd :: string where "mycmd == ''external_executable''" Then I need to use the value of mycmd, which is "external_executable", in a ML code block ...
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Flattening quantification over relations

I have a Relation f defined as f: A -> B × C. I would like to write a firsr-order formula to constrain this relation to be a bijective function from A to B × C? To be more precise, I would like the ...
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Simple lemma in Isabelle

I've been trying to learn how to use Isabelle and I've come across a problem. The following lemma works: lemma sum_square: "(a+b)^2=a^2+(2::real)*a*b+b^2" apply (simp add: power2_eq_square) output: ...
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How to prove “(∀x. P) ∧ Q ⟹ ∀x. P” using conjunct1 in Isabelle?

I'm trying to prove this: lemma assumes 0: "(∀x. P) ∧ Q" shows "∀x. P" proof - show ?thesis using 0 by (rule conjunct1) qed I'm getting: Failed to apply initial proof method⌂: using this: ...
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Trying to generalize a bit vector that uses typedef, bool list, and nat length

I investigated Coq a little, with its dependent types. I have only the foggiest idea about it all, but now I have in mind that I want a bit vector as a bool list, in which the length of the vector ...
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48 views

Is there an Isabelle equivalent to Haskell newtype?

I want to make a new datatype shaped like an old one, but (unlike using type_synonym) it should be recognized as distinct in other theories. My motivating example: I'm making a stack datatype out of ...
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Solving equations with an associative and commutative operator

Consider a goal like this in Isabelle (and don’t worry about ccProd and ccFromList): ccProd {x} (set xs) ⊔ (ccProd {x} (set ys) ⊔ (ccFromList xs ⊔ (ccFromList ys ⊔ ccProd (set xs) (set ys)))) = ...
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Calculating transitive closures (II)

I have asked a previous question on calculating a transitive closure. In certain occasions, it is more appropriate to calculate the whole transitive closure. Getting back to my previous example: ...
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Can I overload the notation for operators that are assigned to bool and list?

(NOTE: If I can get rid of the warning I show below, then I say a bunch of extraneous stuff. As part of asking a question, I also do some opinionating. I guess that's sort of asking the question ...
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Integration in Isabelle

I've recently started working with Isabelle and I've been trying to explore different parts of it. Is it possible to prove an integration possible in Isabelle? Such as the integrating x between ...
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Proving Skip: “(SKIP,s)⇒ s” terminates in Isabelle

How can I show that "(SKIP,s)⇒ s", which is a rule of the Big Step Semantics, terminates in Isabelle? Big Step Semantics is defined as follows "(SKIP,s)⇒ s" is one command. inductive ...
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Proving insertion sort algorithm using Isabelle

I did some implementation of the insert sort algorithm in Isabelle/HOL for the generation of code (ML, Python, among others). I'm sure the corresponding functions work fine, but I need to create some ...
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Proving lemma in Isabelle

I have a function fun exec :: "com ⇒ state ⇒ nat ⇒ state option" where "exec _ s 0 = None" | "exec SKIP s (Suc f) = Some s" | "exec (x::=v) s (Suc f) = Some (s(x:=aval v s))" | "exec ...
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Getting coefficients of a polynomial mod as an int list in Isabelle

I am attempting to get an int list of coefficients of a remainder of the division of two polynomials. I have been attempting to use mod from Polynomial.thy on two polynomials of type int poly. ...
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Defining disjoint union of different types in Isabelle and more

I asked a series of question to get to the point I can define the following simple model in Isabelle, But I still stuck in getting what I wanted. I try to very briefly describe the problem with an ...