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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539 views

Are there any Bitwise Operator Laws?

Thinking in terms of Algebraic laws, I was wondering if there are any official guide lines which exist in the realm of bit manipulations, similar to Algebra. Algebraic Example a - b =/= b - a Let a ...
1
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0answers
277 views

Has Comb Sort been proven correct? Can it be?

I've been doing some research on Comb Sort and I'm trying to figure out whether the algorithm has been proven correct. However, I can't seem to find a great deal of documentation on the algorithm. ...
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2answers
2k views

Using Ogden’s Lemma versus regular Pumping Lemma for Context-Free Grammars

so I'm learning the difference between the lemmata in the question. Every reference I can find uses the example: {(a^i)(b^j)(c^k)(d^l) : i = 0 or j = k = l} to show the difference between the two. ...
8
votes
2answers
357 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 ...
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2answers
591 views

Homework - Prove Big-Omega

Question: (5n^2)(ln(n)) is big-omega of n(ln(n)^2) What I have tried: Exist c > 0, n0 > 0 (5n^2)(ln(n)) >= cn(ln(n)^2) for all n >= n0 (5n^2)(ln(n)) >= n(ln(n)) (for n >= 1) >= n(ln(n)^2) (for n ...
6
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1answer
7k 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 ...
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4answers
2k 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 ...
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1answer
95 views

Minimum number of statements: P or NP? [closed]

It is a common programmer hobby to write programs which accomplish a task in 1 line of source code. But that is a bit trivial: I can take 1 000 000 lines of code, delete all the line breaks, and ...
4
votes
2answers
906 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 := { ...
0
votes
4answers
186 views

How would one know if one saw a random number generator?

I have been reading various articles about random numbers and their generators. There are usually 3 important conclusions that I draw from them: Random numbers are not truly random Much of the time ...
4
votes
1answer
11k views

Using big-O to prove N^2 is O(2^N)

I can clearly see than N^2 is bounded by c2^N, but how do i prove it by using formal definition of big-O. I can simply prove it by M.I. Here is my attempt.. By definition, there for any n>n0, there ...
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2answers
803 views

Is it theoretically possible to design a provably unhackable hardware/software system?

Has there been any work done on any hypothetical hardware + OS architecture or overall software design which is provably not possible to hack? In other words, an architecture which allows for only ...
2
votes
1answer
362 views

Using coq, trying to prove a simple lemma on trees

Trying to prove correctness of a insertion function of elements into a bst I got stuck trying to prove a seemingly trivial lemma. My attempt so far: Inductive tree : Set := | leaf : tree | node : ...
1
vote
1answer
175 views

Proof - Coq - Do I need induction?

I have a scenario where I want to prove a lemma including a number of string and list variables. Probably, it needs 'induction', but can anybody help me proving the lemma given below. If the rest of ...
0
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1answer
166 views

Proving lemma with implication based on functions

I want to prove the lemma below. I am trying to to use tactic 'destruct', but I can't prove it. Please any body guide me how can I prove such lemmas. I can prove it for EmptyString, but not ...
1
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1answer
155 views

Proving a perfect hash function over a fixed length input

I have seen the answers on here stating to use gperf, however, I would prefer to roll my own based on the proof that I create for the domain of strings with a fixed length of <= 200 Based on the ...
0
votes
1answer
294 views

Proof with big-oh

Just starting to learn big-oh and asymptotic analysis and I am stuck on this particular proof: How can we prove 2^n is O(n!)? Thanks
2
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1answer
302 views

Proving correctness in formal logic

I was wondering if anyone could help me answer this question. It is from a previous exam paper and I could do with knowing the answer ready for this years exam. This question seems so simple that I ...
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3answers
274 views

Show bit strings with count(1s) = count(0s) isn't regular

Let L be the language consisting of strings over alphabet {0,1} that contain an equal number of 1s and 0s. For example: 000111 10010011 10 1010101010 How can you show that L isn't a regular ...
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2answers
873 views

Quicksort proof using Coq

I am writing a thesis on program verification of the quicksort algorithm using the Coq system. I have defined a quicksort in Coq but my supervisor and myself arn't very comfortable writing the actual ...
3
votes
4answers
434 views

How do people prove the correctness of Computer Vision methods?

I'd like to pose a few abstract questions about computer vision research. I haven't quite been able to answer these questions by searching the web and reading papers. How does someone know whether a ...
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1answer
72 views

Verification: combining correctness statements

The question is: P1 {C} Q1 ------------------------- P1 && P2 {C} Q1||Q2 Is this rule valid? How would I go about tackling something like this? All I can think of is to try to ...
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votes
2answers
1k 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. ...
1
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2answers
283 views

Proving an algorithm is correct for solving a game

Given is a row of at most 30 stones which can either be black or white. No gaps are allowed at the start of the game, but there can be less than 30 stones. The goal is to remove all the stones. Only ...
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3answers
5k 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) ...
2
votes
3answers
4k views

(log n)^k = O(n)? For k greater or equal to 1

(log n)^k = O(n)? For k greater or equal to 1. My professor presented us with this statement in class, however I am not sure what it means for a function to a have a time complexity of O(n). Even ...
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2answers
368 views

Flawed random number generator?

I used this weighted random number generator. import random def weighted_choice(weights): totals = [] running_total = 0 for w in weights: running_total += w ...
1
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1answer
1k views

proof of correctness by loop invariant (induction)

I wrote my own trivial little function (php for convenience) and was hoping someone could help structure a proof by induction for it, just so I can get a very basic hang of it. function ...
5
votes
1answer
342 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 ...
3
votes
1answer
2k views

Lower bounds on comparison sorts for a small fraction of inputs?

Can someone please walk me through mathematical part of the solution of the following problem. Show that there is no comparison sort whose running time is linear for at least half of the n! inputs of ...
0
votes
1answer
682 views

Prove for any a > b >0, b^n in Big-O a^n

Prove that for any real numbers, a, b such that a > b > 0, b^n is O(a^n), n >=1. I have searched several textbooks I own on Discrete Mathematics as well as several online searches for any ...
4
votes
3answers
3k views

Big Oh Notation O((log n)^k) = O(log n)?

In big-O notation is O((log n)^k) = O(log n), where k is some constant (e.g. the number of logarithmic for loops), true? I was told by my professor that this statement was true, however he said it ...
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votes
2answers
2k 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 ...
0
votes
1answer
1k views

How do you prove this pumping lemma example? [closed]

I got this question wrong on my test and was wondering if someone could explain it, showing the steps taken to come to the conclusion. Any help would be appreciated. In the PL proof for L_neq = ...
4
votes
3answers
898 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, ...
9
votes
2answers
4k 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 ...
1
vote
2answers
742 views

Proving big O of statement [closed]

I am having a hard time proving that n^k is O(2^n) for all k. I tried taking lg2 of both sides and have k*lgn=n, but this is wrong. I am not sure how else I can prove this.
1
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1answer
146 views

How to prove by induction that a parabola corresponding to two edges intersects at atmost 2 points?

I have many parabolas that are intersecting each other. I am generating a list S from the upper segments of these parabolas. Since the corresponding two edges of a parabola intersect each other at ...
7
votes
3answers
446 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 ...
3
votes
3answers
1k views

Implementation of binary tree

The following text is snippet from algorithms book. We could draw the binary trees using rectangular boxes that are customary for linked lists, but trees are generally drawn as circles ...
4
votes
1answer
5k views

Proof that the halting problem is NP-hard?

(I apologize if this is the wrong site for this question, but given that there are many "not-hard-enough-for-CS-Theory" CS theory questions floating around here, I think that this might be a good fit. ...
1
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0answers
136 views

Proving My Coroutines Work

I just wrote a coroutine (as an exercise) implementation based on Mono Continuations (very weird experience). What are some ways / approaches that I should take to prove its correctness?
2
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1answer
1k views

Why are all LL(1) grammars LR(1)?

It's a widely-known fact that any LL(1) grammar is also LR(1), but I can't seem to find a rigorous proof of this anywhere. I've heard some high-level overviews of the proof (for example, that since ...
3
votes
2answers
931 views

Bipartite connected graph proof

A friend presented me with a conjecture that seems to be true but neither of us can come up with a proof. Here's the problem: Given a connected, bipartite graph with disjoint non-empty vertex sets ...
13
votes
1answer
371 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) ...
0
votes
1answer
636 views

String to string correction problem np-completeness proof

I have this assignment to prove that this problem: Finite alphabet £, two strings x,y € £*, and a positive integer K. Is there a way to derive the string y from the string x by a sequence ...
0
votes
4answers
609 views

Prove that reverse=rev

I have some task to do, but don't know how to do it: reverse, rev :: [a] [a] reverse [] = [] reverse (x:xs) = reverse xs ++ [x] rev = aux [] where aux ys [] = ys aux ys (x:xs) = aux (x:ys) ...
0
votes
1answer
166 views

I need a proof for a function postcondition

this is a homework but I just cannot get my head around this whole business with writing formal prooves. Could anyone crack this and write formal proof for postcondition of this fnc: string ...
2
votes
6answers
1k views

Prove correctness of unit test

I'm creating a graph framework for learning purposes. I'm using a TDD approach, so I'm writing a lot of unit tests. However, I'm still figuring out how to prove the correctness of my unit tests For ...
3
votes
1answer
6k views

Help with Big Omega Proof?

I am having trouble solving a proof. Where t(n) <= cn^1.6, c being a constant. In general, Big Omega is the opposite of Big O in that it is the best case scenerio and looks for the lower bound. So ...