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 ...

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59
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7answers
14k views

Explain the proof by Vinay Deolalikar that P != NP

Recently there has been a paper floating around by Vinay Deolalikar at HP Labs which claims to have proved that P != NP. Could someone explain how this proof works for us less mathematically inclined ...
57
votes
10answers
16k views

In Laymen's terms, what is the pumping lemma

So I saw this question and was curious as to what the Pumping Lemma was (Wikipedia wasn't much help). I understand that its basically a theoretical proof that must be true in order for a language to ...
50
votes
4answers
2k views

Concrete example showing that monads are not closed under composition (with proof)?

It is well-known that applicative functors are closed under composition but monads are not. However, I have been having trouble finding a concrete counterexample showing that monads do not always ...
44
votes
32answers
7k views

Why can't programs be proven?

Why can't a computer program be proven just as a mathematical statement can? A mathematical proof is built up on other proofs, which are built up from yet more proofs and on down to axioms - those ...
30
votes
1answer
1k views

LaTeX natural deduction proofs using Haskell

How can one create LaTeX source for natural deduction proof trees (like those shown here) via Haskell eg using HaTeX? I'd like to emulate LaTeX .stys like bussproofs.sty or proof.sty.
22
votes
2answers
970 views

C# Code Contracts: What can be statically proven and what can't?

I might say I'm getting quite familiar with Code Contracts: I've read and understood most of the user manual and have been using them for quite a while now, but I still have questions. When I search ...
19
votes
5answers
2k views

proofs about regular expressions

Does anyone know any examples of the following? Proof developments about regular expressions (possibly extended with backreferences) in proof assistants (such as Coq). Programs in dependently-typed ...
17
votes
4answers
2k views

Functional proofs (Haskell)

I failed at reading RWH; and not one to quit, I ordered Haskell: The Craft of Functional Programming. Now I'm curious about these functional proofs on page 146. Specifically I'm trying to prove 8.5.1 ...
13
votes
1answer
359 views

Is this always true: fmap (foldr f z) . sequenceA = foldr (liftA2 f) (pure z)

import Prelude hiding (foldr) import Control.Applicative import Data.Foldable import Data.Traversable left, right :: (Applicative f, Traversable t) => (a -> b -> b) -> b -> t (f a) ...
12
votes
1answer
696 views

How do you prove that a function is unique for its type?

id is the only function of type a -> a, and fst the only function of type (a,b) -> a. In these simple cases, this is fairly straightforward to see. But in general, how would you go about ...
12
votes
1answer
192 views

Proving associativity of natural number addition using Scala shapeless

The following code is Idris: natAssociative : (a : Nat) -> (b : Nat) -> (c : Nat) -> (a + b) + c = a + (b + c) natAssociative Z b c = the (b + c = b + c) refl natAssociative (S k) b c = ...
11
votes
19answers
2k views

Should code be short/concise?

When writing a mathematical proof, one goal is to continue compressing the proof. The proof gets more elegant but not necessarily more readable. Compression translates to better understanding, as ...
11
votes
6answers
1k views

Proving correctness of multithread algorithms

Multithread algorithms are notably hard to design/debug/prove. Dekker's algorithm is a prime example of how hard it can be to design a correct synchronized algorithm. Tanenbaum's Modern operating ...
10
votes
7answers
2k views

How do you “get it” when it comes to proofs?

When we start getting into algorithm design and more discrete computer science topics, we end up having to prove things all of the time. Every time I've seen somebody ask how to become really good at ...
10
votes
4answers
1k views

Find subset with elements that are furthest apart from eachother

I have an interview question that I can't seem to figure out. Given an array of size N, find the subset of size k such that the elements in the subset are the furthest apart from each other. In other ...
9
votes
3answers
394 views

I can't prove (n - 0) = n with Idris

I am trying to prove, what to my mind is a reasonable theorem: theorem1 : (n : Nat) -> (m : Nat) -> (n + (m - n)) = m Proof by induction gets to the point where me need to prove this: lemma1 ...
9
votes
2answers
3k views

Proof by Induction of Pseudo Code

I don't really understand how one uses proof by induction on psuedocode. It doesn't seem to work the same way as using it on mathematical equations. I'm trying to count the number of integers that ...
9
votes
4answers
2k views

Proof that Fowler's money allocation algorithm is correct

Martin Fowler has a Money class that has a money allocation routine. This routine allocates money according to a given list of ratios without losing any value through rounding. It spreads any ...
9
votes
1answer
111 views

Open Type Level Proofs in Haskell/Idris

In Idris/Haskell, one can prove properties of data by annotating the types and using GADT constructors, such as with Vect, however, this requires hardcoding the property into the type (e.g. a Vect has ...
9
votes
2answers
2k views

Logic Proof of Associative Property for XOR

I came across a common programming interview problem: given a list of unsigned integers, find the one integer which occurs an odd number of times in the list. For example, if given the list: ...
9
votes
1answer
282 views

Proving the Functor laws for free monads; am I doing it right?

I'm having a bit of a hard time understanding how to prove the Functor and Monad laws for free monads. First off, let me put up the definitions I'm using: data Free f a = Pure a | Free (f (Free f ...
8
votes
3answers
392 views

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 ...
8
votes
1answer
2k views

Context Free Language Question (Pumping Lemma)

I know this isn't directly related to programming, but I was wondering if anyone know how to apply the pumping lemma to the following proof: Show that L={(a^n)(b^n)(c^m) : n!=m} is not a context ...
7
votes
1answer
270 views

Proofs of Applicative laws for haskell instances

Have all the Haskell instances of Applicative typeclass that we get with the Haskell platform been proved to satisfy all the Applicative laws? If yes, where do we find those proofs? The source code ...
7
votes
3answers
345 views

Would the ability to declare Lisp functions 'pure' be beneficial?

I have been reading a lot about Haskell lately, and the benefits that it derives from being a purely functional language. (I'm not interested in discussing monads for Lisp) It makes sense to me to ...
7
votes
3answers
4k views

General proof strategies to show correctness of recursive functions?

I'm wondering if there exists any rule/scheme of proceeding with proving algorithm correctness? For example we have a function $F$ defined on the natural numbers and defined below: function F(n,k) ...
7
votes
3answers
470 views

What laws are the standard Haskell type classes expected to uphold?

It's well-known that Monad instances ought to follow the Monad laws. It's perhaps less well-known that Functor instances ought to follow the Functor laws. Nevertheless, I would feel fairly confident ...
7
votes
0answers
159 views

Sorted list in idris (insertion sort)

I am writing an undergraduate thesis on usefulness of dependent types. I am trying to construct a container, that can only be constructed into a sorted list, so that it is proven sorted by ...
6
votes
4answers
2k views

prove n = Big-O(1) using induction

I know that the relation n = Big-O(1) is false. But if we use induction involving Big-O it can be proved. But the fallacy is we cannot induct Big-O. But my question is how we can disprove the relation ...
6
votes
11answers
3k views

Formally verifying the correctness of an algorithm

First of all, is this only possible on algorithms which have no side effects? Secondly, where could I learn about this process, any good books, articles, etc?
6
votes
2answers
373 views

General proof of equivalence of two FSMs in finite time?

Does a general proof exist for the equivalence of two (deterministic) finite state machines that always takes finite time? That is, given two FSMs, can you prove that given the same inputs they will ...
6
votes
2answers
260 views

Core of Verifier in Isabelle/HOL

Question What is the core algorithm of the Isabelle/HOL verifier? I'm looking for something on the level of a scheme metacircular evaluator. Clarification I'm only interested in the Verifier , not ...
6
votes
2answers
754 views

Stable comparison sort with O(n * log(n)) time and O(1) space complexity

While going through Wikipedia's list of sorting algorithms I noticed that there's no stable comparison sort that has O(n*log(n)) (worst-case) time-complexity and O(1) (worst-case) space-complexity. ...
6
votes
2answers
332 views

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 ...
6
votes
3answers
9k views

How to determine the height of a recursion tree from a recurrence relation?

How does one go about determining the height of a recursion tree, built when dealing with recurrence run-times? How does it differ from determining the height of a regular tree? edit: sorry, i ...
6
votes
1answer
146 views

Finding inaccessible points on a 2D plane

I have been working on JavaScript / JQuery code which allows arrow key movement between input boxes (yes, I am aware this breaks standard UI). It works by by looping through each element and finding ...
5
votes
3answers
6k views

Number of binary search trees over n distinct elements

How many binary search trees can be constructed from n distinct elements? And how can we find a mathematically proved formula for it? Example: If we have 3 distinct elements, say 1, 2, 3, there ...
5
votes
6answers
5k views

Writing a proof for an algorithm

Hi guys i am trying to compare 2 algorithms and thought i may try and write a proof for them !!! (my maths sucks so hence the question) Normally in our math lesson last year we would be given a ...
5
votes
2answers
1k views

How can I prove this operation over Binary search trees?

I'd want you to give me a hint to prove this exercise from the book of Cormen: "Prove that no matter what node we start at in a height-h binary search tree, k successive calls to TREE-SUCCESSOR take ...
5
votes
1answer
4k views

I need help proving that if f(n) = O(g(n)) implies 2^(f(n)) = O(2^g(n)))

In a previous problem, I showed (hopefully correctly) that f(n) = O(g(n)) implies lg(f(n)) = O(lg(g(n))) with sufficient conditions (e.g., lg(g(n)) >= 1, f(n) >= 1, and sufficiently large n). Now, I ...
4
votes
4answers
2k views

How can we prove by induction that binary search is correct?

I'm having a hard time understanding how induction, coupled with some invariant, can be used to prove the correctness of algorithms. Namely, how is the invariant found, and when is the inductive ...
4
votes
3answers
695 views

What's wrong with this inductive proof that mergesort is O(n)?

Comparison based sorting is big omega of nlog(n), so we know that mergesort can't be O(n). Nevertheless, I can't find the problem with the following proof: Proposition P(n): For a list of length n, ...
4
votes
2answers
251 views

Using the value of a computed function for a proof in agda

I'm still trying to wrap my head around agda, so I wrote a little tic-tac-toe game Type data Game : Player -> Vec Square 9 -> Set where start : Game x ( - ∷ - ∷ - ∷ - ∷ - ∷ - ...
4
votes
4answers
2k views

How to prove (forall x, P x /\ Q x) -> (forall x, P x) [In Coq]

How does one prove (forall x, P x /\ Q x) -> (forall x, P x) in Coq? Been trying for hours and can't figure out how to break down the antecedent to something that Coq can digest. (I'm a newb, ...
4
votes
1answer
81 views

How or is that possible to prove or falsify `forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q.` in Coq?

I want to prove or falsify forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q. in Coq. Here is my approach. Inductive True2 : Prop := | One : True2 | Two : True2. Lemma True_has_one : ...
4
votes
2answers
700 views

How to solve goals with invalid type equalities in Coq?

My proof scripts are giving me stupid type equalities like nat = bool or nat = list unit which I need to use to solve contradictory goals. In normal math, this would be trivial. Given sets bool := { ...
4
votes
1answer
296 views

Congruence for heterogenous equality

I'm trying to use heterogenous equality to prove statements involving this indexed datatype: data Counter : ℕ → Set where cut : (i j : ℕ) → Counter (suc i + j) I was able to write my proofs using ...
4
votes
3answers
135 views

Apply a method if and only if it solves the current goal

Sometimes, when I’m writing apply-style proofs, I have wanted a way to modify a proof method foo to Try foo on the first goal. If it solves the goal, good; if it does not solve it, revert to ...
4
votes
1answer
32 views

How to prove functions equal, knowing their bodies are equal?

How can we prove the following?: Lemma forfun: forall (A B : nat->nat), (forall x:nat, A x = B x) -> (fun x => A x) = (fun x => B x). Proof.
4
votes
1answer
82 views

How to end this Proof in Coq

I have managed to reduce my goal to (fun x0 : PSR => me (x x0)) = x I know that reflexivity will work, but for pedagogical reasons I prefer to continue reducing it. me is an identity function ...