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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Merging two small sequencies - algorithm

Prove that it is enough to make at most 5 comparisons in order to merge two sorted sequences of lengths 2 and 5.
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Needs a proof in a part of prime factorisation

According to topcoder Link, We need to compute till square root of number to list its all prime factors... Now I am able to prove in the following code that we are doing right till we are in the for ...
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57 views

Why do we need to use the negation part in Turing's Halting Proof?

For instance, let's say I have this Turing machine, H, which tells us whether or not a program and input will halt. Let's say we call H on itself. It has to give an answer, so if it prints out "does ...
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57 views

batch processing proof of the number of jobs' relationship with service time and waiting time

The classical batch processing system ignores the cost of increased waiting time for users. Consider a single batch characterized by the following parameters: M average mounting time T average ...
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85 views

Theorem Prover: How to optimize a backward proof search containing a “useless rule AND”

Quick review: Inference rule = conclusion + rule + premises Proof tree = conclusion + rule + sub-trees Backward proof search: given an input goal, try to build a proof tree by applying inference ...
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Time complexity in backtracking algorithm

I what to calculate the worst case, time complexity for this recursive function. list is a list of m*n pieces. matrix is a matrix of mxn to fill with this peaces. Backtrack(list, matrix): ...
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107 views

Prove that (x+1)! is not O(x!) [closed]

Discrete math question which is as follows: Prove that (x+1)! is not O(x!) using only the definition of Big-Oh notation. (Hint!: log(a * b) = (log a + log b)) I used a proof by contradiction saying ...
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58 views

Proof time complexity for recursive function

I'm trying to determine the complexity of this function, where D and element are integers and list is an ordered list of integers. Note from this that (otherElement-element) will be strictly positive. ...
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48 views

Proof time complexity

I'm trying to determine the complexity of this two functions, where D in an integer and list is a list of integers: def solve(D, list): for element in List: doFunc(element, D, list) def ...
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645 views

Introduction to Algorithm 3rd edition, Exercise 4.3-6

4.3-6 Show that the solution to T(n)=2T(n/2 + 17) + n is O(nlgn). Using substitution method, I tried to solve this question by assuming T(n/2+17) <= C(n/2+17)lg(n/2+17) However I can not ...
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849 views

Paypal payments verify

Hello and sorry for my english... I have implemented Paypal sdk for android, it works fine! But maybe for my english I don´t understand what i have to do here: @Override protected void ...
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Big-O notation and polynomials?

So I have this problem to do and I am not really sure where to start: Using the definition of Big-O, prove the following: T(n) = 2n + 3 ∈ O(n) T(n) = 5n + 1 ∈ O(n2) T(n) = 4n2 + 2n + 3 ∈ O(n2) if ...
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79 views

coq tactic for replacing bools with Prop

Is there a proof tactic in coq which takes all the boolean operations in an expression (andb, orb, implb, etc) and replaces them with Propositional connectives (and, or, impl) and encapsulates the ...
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107 views

Proving non-existence of an infinite inductive value in Coq

Suppose I have a very simple inductive type: Inductive ind : Set := | ind0 : ind | ind1 : ind -> ind. and I'd like to prove that certain values can't exist. Specifically, that there ...
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367 views

Proof for the greedy algorithm

I recently tried solving a problem on Codeforces I did get the solution right but am now trying to prove it. The algorithm is something like this: Take the smallest discount and apply it on the most ...
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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 ...
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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 ...
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10 views

Use semantics to prove that the postcondition is true following the execution of the program assuming the precondition is true

I am trying to study for a test in my programming language concepts class. I am trying to understand how to solve this problem. Our professor said we don't need to use formal notation to prove the ...
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34 views

Can a red node have just 1 black child in a red-black tree?

The rules for a Red-Black Tree: Every node is either red or black. The root is black. Every leaf (NIL) is black. If a node is red, then both its children are black. For each node, all simple paths ...
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54 views

Proving a theorem about ordered lists

This should be a straight forward thing to prove, but I keep getting stuck. Would be grateful for help... Require Import Arith. Fixpoint At n (l:list nat) := match n with | 0 => match l ...
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194 views

Derive relationship between sum of all edge weights and MST in a graph satisfying the triangle inequality

A weighted, undirected graph with n vertices and m edges is said to satisfy the triangle inequality if for every edge (u, v), the weight of (u, v) is less than or equal to the length of any other ...
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291 views

Minimum spanning tree. unique min edge vs non unique proof

So I have an exercise that I should prove or disprove that: 1) if e is a minimum weight edge in the connected graph G such that not all edges are necessarily distinct, then every minimum spanning ...
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263 views

algorithm proof - building least number after deleting k digits from an n-digit number

Problem: given an n-digit number, which k (k < n) digits should be deleted from it to make the number left is the smallest among all cases (the relative sequence of remaining digits should not ...
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GeoProof error, art_render_invoke: no image source given?

This is basically all it is, on Windows 8, running GeoProof, I get the message: "art_render_invoke: no image source given." I do not know how to fix it, no matter what I have tried, it pops up this ...
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55 views

Pumping Lemma for Regular Languages

I'm having some trouble with a rather difficult question. I'm being asked to prove the language {0^n 1^m 0^n | m,n >= 0} is irregular using the pumping lemma. In all the examples I've seen, the ...
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258 views

Proving a Turing Machine counts in O(n)?

So for the past few days I've been designing a Turing Machine and found out that with my implementation my counting in binary runs at about 4n, where n is the number I count up to. So O(4n) -> O(n). I ...
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Formally and Informally describe the language of this grammar

I have a question I would like some help with: Formally and informally describe the language of the following grammar G = (Σ, N, S, P) Σ = {a,b,c} N = {S,T,X} S = S p = { S->aTXc, S->bTc, ...
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Proof through Number of Derivation Steps

Given G = {a, b, c, d}, {S, X, Y}, S, {S->XY, X->aXb, X->ab, Y->cYd, Y->cY, Y->cd}} Prove that |w|c-|w|d+|w|a≥|w|b |w|a is how many 'a's there are in the string. This makes sense that there will be ...
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134 views

Proof of reverse binary strings?

If w : {1...L} → {0,1} is a binary string, the complement of w, denoted wC, is a string of length L defined by: wc(i) = 1 - w(i). The reverse of w, denoted wR, is the string of the length L defined by ...
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148 views

parseInt() and parseFloat(): Can this second assertion ever fail?

I've been using parseInt() and parseFloat() in various contexts for a while now, and I'd like to think I know all the ins and outs of the two. But recently I had a curious thought which I so far ...
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90 views

List comprehensions in Coq

I want to use Monad comprehensions in Coq. Since I thought it is very difficult for me to implement notations which needs MonadPlus such as [ x | x <- m, x < 4 ], I didn't try to implement such ...
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65 views

Ill-typed with/rewrite desugaring

The background is the data type of finite maps ordered by keys, as mentioned in this previous question: open import Function open import Relation.Binary renaming (IsEquivalence to IsEq) open import ...
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430 views

Reduction from Maximum independent set to Dominating set to prove the Dominating set is NP-complete

I know of the reduction from the Vertex cover to Dominating set. However, I was seeing if I could get a reduction from the maximum independent set problem straight to the Dominating set problem in ...
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Proof of Loop Invariant and Algorithm

How would I get a loop invariant and prove it for the following algorithm. power(x,y): z = 1 m = 0 while m < y: z = z*x m = m+1 return z
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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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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 ...
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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?
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Proof by Induction of the sum of heights of nodes in a full binary tree

I'm trying to prove the following by induction: sum(k*2^(H-k), k = 0 .. H) = N-H-1 it's a problem for an algorithms class. I was thinking I could do what I normally do for summations, which is to ...
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610 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) ...
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439 views

Formal Equivalence between programming languages

We have 2 languages which are (informally) semantically equivalent but syntactically different. One is xml and another is script based. How can I go about formally proving that both languages are in ...
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189 views

How can I prove by induction that the second of these two algorithms is faster?

I have two algorithms. A. Solves problem in 2^n seconds. B. Solves problem in n^2 + 1,000,000 seconds. How can I inductively prove that B is faster than A. I'm told that 2^n > 2n+1 for n>2 might ...
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417 views

Stable Matching Problem

I am currently reading an Algorithm's book and came across the Stable Matching Problem. And a question came to mind that I'm curious about, but the book doesn't answer. In every SMP is it possible to ...
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How to prove by induction that a program does something?

I have a computer program that reads in an array of chars that operands and operators written in postfix notation. The program then scans through the array works out the result by using a stack as ...
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60 views

Prove that a graph is bipartite

Given a graph G in which every edge connects an even degree node with an odd degree node. How can i prove that the graph is bipartite? Thanks in advance
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Proof with false hypothesis in Isabelle/HOL Isar

I am trying to prove a lemma which in a certain part has a false hypothesis. In Coq I used to write "congruence" and it would get rid of the goal. However, I am not sure how to proceed in Isabelle ...
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How to prove x + y - z = x + (y - z) in Coq

I want to prove this : 1 subgoals x : nat y : nat z : nat ______________________________________(1/1) x + y - z = x + (y - z) It looks trivial, but it confuse me a lot, and I need it for another ...
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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 = ...
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Show a complete graph with n vertices, the weight of a MST is less than or equal to the min weight of cycle that passes through all vertices

I am really struggling with this proof and would really appreciate a detailed explanation: Show a complete graph with n vertices, the weight of a MST is less than or equal to the min weight of cycle ...
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What's the best way to write Mathematical Proofs on the web? [closed]

This question about displaying equations on the web is similar to what I'm asking but does not answer my question. It's about math. I'm extending that to proofs. This is a key difference because my ...
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63 views

How do I get symbolic square root and logarithm functions in SBV?

The only solution I can find is to do a square root approximation, but this doesn't work symbolically so I can't use it for proving.