Questions tagged [isabelle]

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

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What does Metis: Unused theorems mean in this context?

I'm very new to Isabelle, so apologies if this question is poorly formed. I'm trying to prove the following: record Point = x :: nat y :: nat definition cond :: "Point ⇒ Point ⇒ 𝔹" ...
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How to lift a transitive relation to finite maps?

I'm trying to prove that a transitive relation on elements of finite maps is equivalent to a transitive relation on finite maps itself. Here is a helper lemma, which shows that relations on finite ...
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Statistics for Isabelle development

I have a lengthy development in Isabelle and I'd like to have some statistics about how many lines are for definitions, how many for statements, and how many are comments. Is there any such a tool ...
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Pull all occurrences of the induction variable into the conclusion in Isabelle

I find the book "Isabelle/HOL: A Proof Assitant for Higher-Order logic" a very good reference to improve the apply-style coding in Isabelle. In several parts of the books (for instance section 9.2) ...
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Convert an Isar proof of forall-statement to apply-style

I'm trying to build a very short proof for a given fact. I would like to just use apply-style commands. Now my theorem's structure looks like this: theorem statement apply(some commands) proof ...
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Restrict the domain of a relation in Isabelle

I have a relation that is not well-founded call it r1. It is defined (implicitly) as a function: r1: a' => a' => bool However, I note that if I restrict the type to: r2: b' => b' => ...
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Partial function in Coq / underdefined?

I have been trying to write and verify a compiler in Agda, using Concrete Semantics (which is written for Coq Isabelle/HOL) as a reference point. I am defining compilation for the same languages used ...
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Finite runs on a transition system

I want to write a predicate that would state that a transition system cannot have infinite runs from a state s. So consider the transition system is given by R, then the definition I have come up with ...
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Proving intuitive statements about THE in Isabelle

I would like to prove something like this lemma in Isabelle lemma assumes "y = (THE x. P x)" shows "P (THE x. P x)" I imagine that the assumption implies that THE x. P x exists and is well-defined. ...
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Curry-Howard for term synthesis in Isabelle

Say I have proven some basic proposition of intuitionistic propositional logic in Isabelle/HOL: theorem ‹(A ⟶ B) ⟶ ((B ⟶ C) ⟶ (A ⟶ C))› proof - { assume ‹A ⟶ B› { assume ‹B ⟶ C› ...
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How to use obtain to make forward elimination proofs easier to read?

I'm trying to do basic natural deduction proofs in Isabelle, following this document (particularly slide 23). I know I can do things like theorem ‹(A ⟶ B) ⟶ A ⟶ B› proof - { assume ‹A ⟶ B› ...
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Equivalence between apply and Isar styles in Isabelle

Are apply style and Isar-proofs equivalents? This is a question that I have thougth for some time. Of course, Isar-proofs are much more readable, maintanable and easy to write (?) but my question is ...
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166 views

How to define a termination order for the function with fmmap_keys?

I'm trying to define a supremum operation for a datatype based on fmap: datatype t = A | B | C "(nat, t) fmap" abbreviation "supc f xs ys ≡ fmmap_keys (λk x. f x (the (fmlookup ys k))) ...
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Isabelle : complement of datatype

datatype aaa = A | B lemma "(a ~= A) --> (a = B)" How to prove this basic lemma? I'm relatively new to Isabelle, and the problem is confusing.
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Proving the correctness of an algorithm to partition lists in Isabelle

I trying to prove correct an algorithm to split a list of integers into sublists of equal sum in linear time. Here you can see the algorithm I have chosen to do so. I would like to get some feedback ...
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Reasoning about overlapping inductive definitions in Isabelle

I would like to prove the following lemma in Isabelle: lemma "T (Open # xs) ⟹ ¬ S (Open # xs) ⟹ count xs Close ≤ count xs Open" Please find the definitions below: datatype paren = Open | Close ...
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JEdit plugin error while loading Isabelle

I am working with a Windows 8 device and after some work with Isabelle I get the following error: The following plugin could not be loaded: C:\Users\PC\Desktop\Isabelle2018\src\Tools\jEdit\...
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Can erule produce erroneous subgoals?

I have the following grammar defined in Isabelle: inductive S where S_empty: "S []" | S_append: "S xs ⟹ S ys ⟹ S (xs @ ys)" | S_paren: "S xs ⟹ S (Open # xs @ [Close])" Then I define a gramar T ...
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Proof implication with exist in the premises without using Isar

I have the following goal extracted from one of the theorems I have to prove: ∃ys zs. [x] = ys @ zs ∧ P ys zs ⟹ P [] [x] ∨ P [x] [] Here I wanted to apply the existential elimination rule but it ...
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Floating and interval arithmetic in Isabelle

I'm using the Approximation.thy from the Descision_Procs file for interval arithmetic in Isabelle. The file gives you a tactic for proving inequalities over the reals, such as: theorem "3 ≤ x ∧ x ≤ 6 ...
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Strict option for Sledgehammer

Section 5.2 of A User’s Guide to Sledgehammer for Isabelle/HOL mentions that upon receiving the "One-line proof reconstruction failed" message it may be worth running Sledgehammer with the strict ...
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124 views

How to lift a transitive relation from elements to lists?

I'm trying to prove that a transitive relation on elements of lists is equivalent to a transitive relation on lists (under some conditions). Here is a first lemma: lemma list_all2_rtrancl1: "(...
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37 views

Smart constructor pattern while proving with Isabelle

While studying chapter 3 of Concrete Semantics my instructor mentionned that some of the functions there were built using the smart constructor pattern and stated that this pattern was beneficial for ...
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35 views

How to define a semilattice of lists?

I'm trying to define an upper semilattice: A ≺ B ... ≺ C [B,B,B] ≺ C [B,B] ≺ C [B] ≺ B C [A] ≺ C [B] C [A,A] ≺ C [A,B] ≺ C [B,B] C [A,A] ≺ C [B,A] ≺ C [B,B] C [A,A,A] ≺ C [A,A,B] ≺ C [A,B,B] ≺ C [B,B,...
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What is the correct approach to induct on list length?

I generate lists with various integer patterns and I'd like to prove that the generated lists hold certain properties. The lemmas refer to the items of the generated lists by their positions. The ...
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31 views

How to test for falsity in implications?

In a complex lemma which is basically an implication one may mistakenly form an antecedent that turns out to be falsity. Is there any support in Isabelle for avoiding this situation?
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Proving properties of generated lists

My aim is to prove properties of lists containing generated patterns. In the first example the pattern is simply a sequence of 0s and lemma pattern_0_len proves that the length of the generated list ...
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Constructing useful lemmas

In the tutorial Programming and Proving in Isabelle/HOL there's a step-by-step explanation of the proof of reversing a list twice yields the original list (2.2.4 The Proof Process). theorem rev_rev [...
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45 views

How to prove that a relation property holds for a transitive closure of this relation?

I defined the following relation property: definition rel_limited_under :: "('a ⇒ 'a ⇒ bool) ⇒ 'a set ⇒ bool" where "rel_limited_under R A = (∀x y z :: 'a. R x y ⟶ R y z ⟶ x ∈ A ⟶ z ∈ A ⟶ y ∈ A)...
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How to fix “partially applied constant on left hand side of code equation”?

I'm trying to define the code equation: datatype t = A | B | C inductive less_t :: "t ⇒ t ⇒ bool" where "less_t A B" | "less_t B C" code_pred [show_modes] less_t . fun less_t_fun :: "t ⇒ t ⇒ ...
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How to implement a typed tagless interpreter?

[1] describes a very interesting approach to define a language syntax and semantics. The idea is to use classes instead of ADTs to describe a syntax: class ExpSYM = fixes lit :: "int ⇒ 'a" and ...
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What kind of functions preserve properties of closure?

I'm trying to prove the following lemmas: lemma tranclp_fun_preserve: "(⋀x y. x ≠ y ⟹ f x ≠ f y) ⟹ (⋀x y. f x ≠ f y ⟹ x ≠ y) ⟹ (⋀x y. f x = f y ⟹ x = y) ⟹ (λ x y. P x y)⇧+⇧+ (f x) (f y) ⟹ (...
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Term equality in Isabelle

Is there already some term equality relation defined in Isabelle? What is the broadest set of terms on which it is defined? Just to be clear, I'm looking for a relation a ~ b that returns True iff a ...
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63 views

How to use different code lemmas for different modes of inductive predicate?

(The question is related to How to define an inductive predicate on fset? but a more concrete) Here is a simple theory with 2 kinds of values and a casting predicate: theory FSetIndTest imports ...
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How to define an inductive predicate on fset?

I defined 2 kinds of values and a cast function: theory FSetIndTest imports Main "~~/src/HOL/Library/FSet" begin datatype val1 = A | B datatype val2 = C | D inductive cast_val :: "val1 ⇒ val2 ⇒ ...
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Is it a good idea to extend standard types and operations?

I need to defined an extended bool type (ebool = bool ∪ {⊥}) and a set of operations for the type (conjunction, etc.). Here is the theory: theory EboolTest imports Main "~~/src/HOL/Library/...
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How do you define concave hulls in Isabelle/HOL?

I am working in Isabelle/HOL. Is there a concave equivalent to convex hull S in the library? If not how would one go about defining it?
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Proving implication (a --> c) from (b --> c) given relation between a and b

I want to prove that if one implication is true (b --> c), then it follows that some other implication is also true (a --> c), given that there is an appropriate relation between the a and b. ...
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Proving termination of Takeuchi function in Isabelle

Here is my try at proving that Takeuchi function does terminate: function moore :: "(int ⇒ int ⇒ int) ⇒ (int ⇒ int ⇒ int)" where "moore x y z = ((if (x ≤ y) then 0 else 1) (max(x,y,z) - min(x,y,z)) (...
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Automatic translation from Isabelle/HOL to HOL

I have some definitions and theorems in Isabelle/HOL and need to use those same definitions and theorems with HOL. Translating the code manually is certainly possible, but cumbersome. Are there any ...
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In Isabelle, what do the angle brackets and double asterisks mean?

I'm trying to understand some Isabelle code, and there is some syntax I don't understand. I haven't seen them in tutorials, including the two bundled with the Isabelle2017 distribution, "Programming ...
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How can I fake existential types in Isabelle/HOL?

Consider the following Isabelle/HOL definition of a simple process language: typedecl channel datatype process = Put channel char process | Get "char ⇒ process" | Stop This languages supports ...
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Basic Isabelle/Isar style (exercise 4.6)

I'm interested in using Isabelle/Isar for writing proofs which are both human-readable and machine checked, and I am looking to improve my style and streamline my proofs. prog-prove has the following ...
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Isabelle confused by a previous lemma?

I found something strange while doing exercise 2.5 of the Concrete Semantics book. Basically, we have to prove the famous Gauss formula for the sum n integers. Here is my code: fun sum_upto :: "nat ⇒ ...
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Instantiating a class from a concrete object?

I'm attempting to formalize a series of proofs about topology from a book [1] in Isabelle. I want to encode the idea that a topological space (X,T) consists of a set X of "points" (elements of some ...
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Isabelle2017 can't be opened because it is from an unidentified developer

The security preferences on my MacBook Pro allow installation of only apps from the App Store and identified developers. This policiy has been set by my employer, which I cannot change. As a ...
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35 views

Problems with termination of a recursive function using zip, map, and products

I've encountered a problem when trying to define a recursive function which uses map over a zip. Here is a simplified version of my code, firstly one that works datatype bar = Bar "bar list" ...
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Defining a subclass with parameters in Isabelle

The documentation on typeclasses in Isabelle (section 3.5) explains how to define additional subclass relations "after the fact", by giving proofs of the missing axioms. Is there a way to do this ...
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Instantiating axioms about Sequents explicitly

Note: This is a re-asking of the second question here, which turned out to be less related to the first question (answered there) than I thought it would. Consider the following minimal development ...
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Applying axioms about Sequents

Consider the following minimal development based on the Isabelle Sequents library: theory Test imports Pure Sequents.Sequents begin syntax "_Trueprop" :: "two_seqe" ("((_)/ ⊢ (_))" [6,6] 5) ...