Questions tagged [proof]

A mathematical proof is any mathematical argument which demonstrates the truth of a mathematical statement. Informal proofs are typically rendered in natural language and are held true by consensus; formal proofs are typically rendered symbolically and can be checked mechanically. "Proofs" can be valid or invalid; only the former kind constitutes actual proof, whereas the latter kind usually refers to a flawed attempt at proof.

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Proving (~A -> ~B)-> (~A -> B) -> A in Coq

I have been trying to prove the following tautology in Coq. Theorem Axiom3: forall A B: Prop, (~A -> ~B)-> ((~A -> B) -> A). My plan was the to do following Theorem Axiom3: forall A B: ...
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Z3 Prover (Python bindings) can't determine negated Modus Ponens when proof=True

I'm trying to understand why the Z3 Solver returns "unknown" when trying to satisfy the following inconsistent set of expressions. In [1]: from z3 import * In [2]: set_param(proof=True) In [3]: s = ...
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Proof by contradiction for edge in tree

I have a problem from my textbook that goes like the following; Assume that i have a shortest path matrix S that could look like the following: And a tree T that consist of the shortest paths ...
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Proving a contradiction in Coq

I'm trying to prove a simple lemma with Coq, and I'm having some trouble ruling out an infeasible case. Here is my lemma: Theorem helper : forall (a b : bool), ((negb a) = (negb b)) -> (a = b). ...
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Proof Optimal Substructure for the Rod Cutting Problem Using Cut-And-Paste

I am having difficulties grasping what Cut-and-Paste proofing is and how to proof optimal substructure with it. As an example, I hoped someone could illustrate how to proof optimal substructure for ...
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Coq doesn't recognize equality of dependent list

I made a question before, but i think that question was bad formalized so... I am facing some problems with this specific definition to prove their properties: I have a definition of a list : ...
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Proving another property of finding same elements in lists

Following my question here, I have a function findshare which finds the same elements in two lists. Actually, keepnotEmpty is the lemma I need in my program after applying some changes to the initial ...
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Coq: How to produce a strong polymorphic dependent type hypothesis

I have been having some problems with dependent induction because a "weak hypothesis". For example : I have a dependent complete foldable list : Inductive list (A : Type) (f : A -> A -> A) : ...
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How to implement `forall` (mathematics) in a procedural or OO language

I am trying to understand how to implement forall in a procedural or OO language like Ruby or JavaScript. For example (this is Coq): Axiom point : Type. Axiom line : Type. Axiom lies_in : point ->...
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Natural deduction

I was able to get this one, it was fairly simple. ¬ (¬p ∨ q) |- p { 1. ¬ (¬p ∨ q) premise 2. { 3. ¬p assume 4. ¬p ∨ q ∨i1 3 5. ⊥ ...
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Proof of application equality in coq

I have a sequence of applications in that way (f (f (f x))), being f an arbitrary function and any applications numbers sequences. I want to prove that f (x y) and (x (f y)), x = (f f f ...) and y = ...
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Learning coq, not sure what the error means NNPP

So i've just started to learn coq (and it is way over my head so far) and I'm trying to do a basic proof and I'm pretty lost, found some help so far but what I think I'm supposed to do coq throws an ...
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How to formally prove this problem on Ford Fulkerson?

The question is to prove that if we only consider forward edges in our residual graph, then prove that the difference from our solution and the maximum flow is no more than 1/b for some constant b. ...
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How to prove (x+y)/z + (y+z)/x + (x+z)/y>=6 when x,y,z>0

This question actually had two parts. In the first part I had to prove that a + 1/a >=2. I proved it by rearranging it to (a-1)^2 >= 0, which is always true. So, I thought the second problem ...
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Why is it required to check for values upto sqrt(n), to determine divisors of a number

I was looking for the most effecient way to determine the divisors of a number. I found an article that mentioned that instead of iterating from 1 upto n, one can reduce the overall running time by ...
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Naive String Matcher Complexity Proof?

I'm trying to do a proof of how the Naive String Matcher (http://www.personal.kent.edu/~rmuhamma/Algorithms/MyAlgorithms/StringMatch/naiveStringMatch.htm) is O((n - m + 1)m) in the worst case. But I'm ...
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Case analysis in Idris proofs

So I have wirtten the following type to prove some properties of Integers: data Number : Type where PosN : Nat -> Number Zero : Number NegN : Nat -> Number plusPosNeg : Nat -> ...
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Dividing players into “winners” and “losers”: how to prove that greedy solution gives optimal result?

I have a problem that states the following: n players (where n is even) are to a play games against each other. Everyone will not necessarily play but a player can only play against someone else ...
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(Broad Question) How can you be certain a piece of code works correctly?

An interviewer asked me how I can be sure that a piece of code works as intended to. I said to test the code through all the possible test cases. Are there any other ways you can be certain a piece of ...
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3-way and 2-way merge sort without loss of generality?

So, I am studying 3-way merge sort and I am wondering about the without loss of generality. lets assume that we have array A' with power of 3 elements and A with power of any constant. Here is my ...
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Optimal pairing of bike with person - seeking proof of algorithm

So this is an algorithm question. The problem statement is the following: given two lists of coordinates (or length n each) of bikes and people on a 2D grid (or a 2D grid that show the positions of ...
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Proving `forall x xs ys, subseq (x :: xs) ys -> subseq xs ys` in Coq

I have the following definition Inductive subseq : list nat -> list nat -> Prop := | empty_subseq : subseq [] [] | add_right : forall y xs ys, subseq xs ys -> subseq xs (y::ys) | add_both : ...
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How could I prove this type level Haskell theorem?

With respect to Listing 1, how would I go about proving the type level axiom (t a) = (t (getUI (t a))) holds? Listing 1 data Continuant a = Continuant a deriving (Show,Eq) class UI a ...
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Is this proof with the pumping lemma (no regular language) ok?

I need to proof that a given language is not regular, could this work? The language is M={a^m a^l c b^(m+l)|m,l in N} with the alphabet = {a,b,c}. Proof: Be n in N arbitrary but firm. We choose ...
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Knowing when an Isar-style proof is actually valid in Isabelle

I am working on an exercise while trying to learn the Isar language. I have the following script for a lemma about lists. lemma "EX ys zs. xs = ys @ zs ∧ (length ys = length zs ∨ length ys = length ...
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Can someone give me an example for longest path problem having a NP complexity?

I saw on the internet that finding the longest path problem is NP-Complete problem. For some reason, my teacher tells me that it isn't an NP-complete problem. So now I am looking for an example that ...
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Proof function for an elementary statement about multiplication

If we have three integers a>0, b, ab>=0 such that a*b=ab, then b>=0 and if ab=0 then b=0, if ab>0 then ab>0. What is the good way to implement this statement as a proof function in ATS? I guess the ...
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Which axioms may be safely added to Coq?

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 ...
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106 views

Prove exhaustivity of print function based on a string map in Haskell

When I have an "enum" type, that is, an algebraic data type where none of the cases wrap any other data, I commonly like to project a parser/printer off of a mapping to string, to make sure the parser ...
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Where to find resources/information about proof control in Prolog

As part of an assignment I've been asked to check if proofs in natural deduction are either correct or incorrect, using Prolog. An example text file called "valid.txt" containing a proof looks like ...
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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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Where are are the errors in my inductive proof?

I was asked the following question on an exam and it was only marked wrong with no other marks on it. I went to see the TA who marked it and he could only tell me that it was wrong. I suspect that he ...
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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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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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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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Differentiating between learning and memorisation in Artificial Neural Networks

Is there a good resource that clearly explains the difference between learning and memorisation of artificical neural networks - much better if the source contains mathematical explanations and/or ...
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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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Coq: Proving proposition f (x y) -> f y

Is it possible to prove Lemma A3 (f x: Prop -> Prop)(y: Prop): f (x y) -> f y. either w/ or (preferably) w/out axioms?
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Tokens in a bag

We have n tokens. Every token is either red, blue, or green. These n tokens are in a bag Repeat the following until the bag is empty: 1) If there are more than two tokens in the bag. take two random ...
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How to prove the principle of explosion (ex falso sequitur quodlibet) in Scala?

How do I show that anything follows from a value of a type with no constructors in Scala? I would like to do a pattern match on the value and have Scala tell me that no patterns can match, but I am ...
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2answers
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Equality of finite maps in coq (defined using map2)

Suppose I want to define a type of Monomials in Coq. These would be finite maps from some ordered set of variables to nat where, say, x²y³ is represented by the map that sends x to 2, y to 3 and where ...
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1answer
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Coq - How to proof False when hypotesis is wrong

I made an environment to try to proof what I want/need I have a posfijo function that says if a list (l1) contains another list (l2) at the end. So if I add an element to the first list and I use ...
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Need to prove language L = {a^nb^m: n < m < 2m} is not regular

I don't understand the pumping lemma very well, and could use a simple break down of how to prove something like this.
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Haskell Function Composition with Map Function

I'm going through the Richard Bird's "Thinking Functionally with Haskell" book and there is a section that I can't understand where he's proving a property of the filter method. What he's proving is: ...
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Inductive Proof of Counting Sort?

I am covering the counting sort algorithm, and I understand how it works, but I would like to know if there is a specific way to prove that counting sort is a stable algorithm. I have an idea on how ...
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Schema Operation

Consider a complex system with a multitude of processes. Inside the system, there is a closed group where processes which have joined the group can share messages from the outside world. All ...
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Coq:prove Prop implies arithmetic relations of natural number

I'm trying to prove the following Lemma in coq -- Lemma less_than_two_equivalent: forall x, less_than_two x = true -> x < 2. based on the definition below. Fixpoint less_than (a b:nat): bool:...
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Nested boxes in org mode

I have an org doc that is being exported using latex, and I'm using org mode tables to structure proofs. I would like to place boxes around pieces of these tables, including nested boxes. Is there any ...
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(get-unsat-core) Z3: unsat core is not available

Here is my program which return SAT when there exists a cycle in the graph and UNSAT when there is no cycle: (set-option :fixedpoint.engine datalog) (define-sort s () Int) (declare-rel edge (s s))...
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Proving totality of a function taking at most n recursive calls

Let's say we're writing an implementation of a lambda calculus, and as a part of that we'd like to be able to choose a fresh non-clashing name: record Ctx where constructor MkCtx bindings : List ...