Intelligible semi-automated reasoning (Isar) is an approach to human readable formal proof documents (as opposed to state-based scripting).

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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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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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Proof assistant for mathematics only

Most proof assistants are functional programming languages with dependent types. They can proof programs/algorithms. I'm interested, instead, in proof assistant suitable best for mathematics and only ...
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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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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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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 ...
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How to define Subtypes in Isabelle and what they mean?

The question regarding subtyping in Isabelle is very lengthy here. So my simple question is that how I can define type B to be a subtype of A if I define A as below: typedecl A By doing this I ...
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Untyped set operations in Isabelle

I have the following code in Isabelle: typedecl type1 typedecl type2 consts A::"type1 set" B::"type2 set" When I want to use union operation with A and B as bellow: axiomatization where c0: ...
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How type casting is possible in isabelle

Supose I have the following code in Isabelle: typedecl type1 typedecl type2 typedecl type3 consts A::"type1 set" B::"type2 set" When I want to use union operation with A and B as bellow: ...
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Printing out / showing detailed steps of proof methods (like simp) in a proof in isabelle

Suppose I have the following code in Isabelle: lemma"[| xs@zs = ys@xs ;[]@xs = []@[] |] => ys=zs" (*never mind the lemma body*) apply simp done In the above code, The simp method proves the ...
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Factoring out a lemma premise as a definition causes failure in proof method (auto) application in isabelle

I have the following code in Isabelle: typedecl Person consts age :: "Person ⇒ int" lemma "⟦(∀p::Person. age p > 20);p ∈ Person⟧⟹ age p > 20" apply (auto) done The auto proof method works ...
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Organizing constraints in isabelle in order to model a system

Suppose that I have the following expression in Isabelle/HOL: typedecl Person typedecl Car consts age :: "Person ⇒ int" consts drives ::"(Person × Car) set" consts owns ::"(Person × Car) set" ...
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Can I “map” an “OF” over a list of lemmas

I just wrote this code: lemmas gc_step_intros = normal[OF step.intros(1)] normal[OF step.intros(2)] normal[OF step.intros(3)] normal[OF step.intros(4)] normal[OF step.intros(5)] drop where ...
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Case names for locale interpretation

Some of my locals have quite a few assumptions, very much resembling inductions over data types (that’s where the assumptions come from). When interpreting such a locale, having named cases would be ...
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Taming meta implication in Isar proofs

Proving a simple theorem I came across meta-level implications in the proof. Is it OK to have them or could they be avoided? If I should handle them, is this the right way to do so? theory Sandbox ...
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What can one assume, what is worth assuming in Isar?

In Isar one uses assume with the premise of the goal so that she can use it building the conclusion. The Isabelle/Isar Reference says assume expects to be able to unify with existing premises in the ...
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How to use obtain in existential proofs?

I tried to prove an existential theorem lemma "∃ x. x * (t :: nat) = t" proof obtain y where "y * t = t" by (auto) but I could not finish the proof. So I have the necessary y but how can I feed ...
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How to streamline a proof of a function property on a datatype?

I have created a small proof with the intention of creating an example for using next on proof cases: theory RedGreen imports Main begin datatype color = RED | GREEN fun green :: "color => ...
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Isabelle: Switching between “structured” and “apply-style” proofs

There are two styles of proof in Isabelle: the old "apply" style, where a proof is just a chain of apply (this method) apply (that method) statements, and the new "structured" Isar style. Myself, ...
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When would you use `presume` in an Isar proof?

Isar has, besides assume, also the command presume to introduce facts in an Isar proof block. From what I can see and read in the docs, it does not require the assumption (presumption?) to be ...
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Idiomatic Proof by Contradiction in Isabelle?

So far I wrote proofs by contradiction in the following style in Isabelle (using a pattern by Jeremy Siek): lemma "<expression>" proof - { assume "¬ <expression>" then have ...
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How to make the assumption of the second case of an Isabelle/Isar proof by cases explicit right in place?

I have an Isabelle proof structured as follows: proof (cases "n = 0") case True (* lots of stuff here *) show ?thesis sorry next case False (* lots of stuff here too *) show ?thesis sorry ...
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What is a good way to define a finite multiplication table in Isar?

Suppose I have a binary operator f :: "sT => sT => sT". I want to define f so that it implements a 4x4 multiplication table for the Klein four group, shown here on the Wiki: ...
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What is an Isabelle/HOL subtype? What Isar commands produce subtypes?

I'd like to know about Isabelle/HOL subtypes. I explain a little about why it's important to me in my partial answer to my last SO question: Trying to Treat Type Classes and Sub-types Like Sets and ...
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proof (rule disjE) for nested disjunction

In Isar-style Isabelle proofs, this works nicely: from `a ∨ b` have foo proof assume a show foo sorry next assume b show foo sorry qed The implicit rule called by proof here is rule conjE. ...