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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2
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0answers
69 views

How do you expand an pure ACL2 script into a fully-fledged program [closed]

I see a lot of resources about how to use ACL2 to prove code, as you would expect, but none on how to use your proved code in production. Do I tweak my ACL2 code to work with CLISP/Scheme/Clojure? ...
0
votes
2answers
149 views

Proofing encog xor results in excel

I'm working to proof basic neural network results and so far haven't been able to. I'm doing a feed-forward xor problem in encog and export the final weights and calculated output. To proof I just ...
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.
0
votes
1answer
70 views

Proving Big-O and finding required constants [closed]

I was asked to show that f(n) = 3n^2 + 5n + 2 is O(n^2) and to find the values of the required constants. I didn't provide an answer as I didn't understand the question. When I got the paper back, ...
0
votes
1answer
494 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 ...
1
vote
1answer
84 views

proof by induction using +2

im wondering if this variant of proof by induction is correct the standard proof by induction states that if an equation/algorithm works for n and you can prove that it works for n+1 then you can ...
0
votes
1answer
258 views

Proving that maximum item in a min-heap must be at one of the leaves

How can I go about proving that maximum item in a min-heap must be at one of the leaves, in a tree with N items? I understand the overall design of a min-heap, and I can show/diagram that the ...
0
votes
2answers
37 views

Algebra Help on Inductive Proof?

I am trying to learn inductive proofs for a test tomorrow. I am trying to understand a solution for a problem in a book, but my math is a bit rusty. Can somebody explain how these are all equal? I ...
2
votes
4answers
488 views

Proving this recursive Fibonacci implementation runs in time O(2^n)?

I'm having difficulty proving that the 'bad' version of fibonacci is O(2^n). Ie. Given the function int fib(int x) { if ( x == 1 || x == 2 ) { return 1; } else { return ( f( x - 1 ) ...
-1
votes
2answers
68 views

How does my professor come up with the recursive case in this algorithm analysis?

My professor gave us the following explanation for the recursive algorithm for finding the permutations of a set of numbers: When he has (T(m+1), n-1)) where does that come from? Why is it m+1 ...
0
votes
1answer
38 views

If we prove there is no starvation, we don't need to prove that there is no deadlock or livelock (progress)?

I googled Peterson algorithm proof and noticed that most sites don't bother proving the progress requirement, why is that? Can someone explain?
0
votes
1answer
204 views

Proof of relationship between nodes (n) and height (h) of Full Binary Tree

I have an assignment that reads as follows Prove that the relationship between nodes (n) and height (h) of Full Binary Tree is 2^h=(n+1)/2. I have tried the following: n = 2^(h+1)-1 n+1 = ...
0
votes
1answer
120 views

What's the loop invariant for this code?

I need to come up with a loop invariant for a given piece of code: //pre: x & y >= 0 //post: z = x^y //computes pow(x, y), x^y int pow(int x, int y){ int z = 1; while(y > 0){ ...
1
vote
1answer
480 views

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 ...
2
votes
3answers
7k views

Boolean Algebra - Proving Demorgan's Law

I looked all over Google for a boolean algebra (not set theory) proof of DeMorgan's Law, and couldn't find one. Stack Overflow was also lacking in DeMorgan's Law questions. As part of a homework ...
2
votes
1answer
111 views

Showing f(n) = O(f(n) + g(n))?

I was wondering what the proof for the following Big-O comparison is: f(n) is O(f(n) + g(n))) I understand that we could use: f(n) ≤ constant * (f(n) + g(n)) But I don't know how to ...
-2
votes
3answers
193 views

BigO Prove 1+2+…+n =O(n^2) [closed]

I have started learning Design Analysis of Algorith and i am finding solution to this proof as i want to prove that one plus two plus .... plus n is equal to Big-O n square. I have this pdf where i ...
1
vote
1answer
440 views

k successive calls to tree successor in bst

Prove that K-successive calls to tree successor takes O(k+h) time. Since each node is visited atmost twice the maximum bound on number of nodes visited must be 2k. The time complexity must be O(k). I ...
-1
votes
2answers
124 views

Two strings are anagrams of each other if and only if the sum and product of the characters of the strings are same. How?

I was reading an algorithmic problem at http://learn.hackerearth.com/question/314/finding-non-anagramic-strings-in-a-list/ I came across the following claim: Two strings (of same size) are anagrams ...
0
votes
1answer
145 views

A different way to do induction on lists that needs a proof

I have defined an inductive definition of lists (called listkind) in order make it easy for me to prove a specific theorem by induction on listkind rather than on list. Inductive listkind {X}: list X ...
0
votes
1answer
742 views

Prove big O of addition and subtraction of functions

Suppose f(n) = O(s(n)) and g(n) = O(r(n)). Prove or disprove (by giving a counter example) the following claims: f(n) - g(n) = O(s(n) - r(n)) if f(n) = O(g(n)), then f(n) + g(n) = O(s(n)) I ...
-1
votes
1answer
147 views

Mathematical induction proofs [closed]

For my theory of computation class, we are supposed to do some review/practice problems to work off the rust and make sure we are ready for the course. Some of the problems are induction proofs. I did ...
3
votes
1answer
108 views

How can I bind the schematic variable ?case in a rule for proof by cases?

I would like to define a rule for proof by cases, to be used with proof (cases rule: <rule-name>). I managed to use the case_names and consumes parameters, but I did not manage to bind the ...
2
votes
1answer
190 views

How does agda's inspect function work?

I've seen an example of the inspect function in my last question Using the value of a computed function for a proof in agda , but I'm still having trouble wrapping my head around that. Here's a ...
1
vote
1answer
162 views

double negation insertion in agda

I want some clarification on double negations in agda. even though z≡z : 0 ≡ 0 z≡z = refl I cannot figure out how to prove: ¬¬z≡z : (0 ≡ 0 → ⊥) → ⊥ ¬¬z≡z ? Which is long hand for ¬ (0 ≢ 0). ...
2
votes
3answers
160 views

How can I use rules suggested by solve_direct? (by (rule …) doesn't always work)

Sometimes <statement> solve_direct (which I usually invoke via <statement> try) lists a number of library theorems and says “The current goal can be solved directly with: …”. Let ...
4
votes
2answers
239 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 ( - ∷ - ∷ - ∷ - ∷ - ∷ - ...
2
votes
0answers
76 views

Running and testing a property expressing a relationship between TAKE and APPEND

Basically, I need to write a what the title says, the only relationship I have been able to think of is if I take some number of elements from a list with TAKE and then take the not-as-important other ...
-1
votes
1answer
86 views

Is this proof by induction correct? [closed]

So this is the prompt: Prove that (13^n) + 6, where n is an even integer, is divisible by 7. Here's my proof: Base Case: 13^2 + 6 = 169 + 6 = 175 175/7 = 25 IH: assume 13^n + 6, where n is ...
2
votes
1answer
395 views

Loop Invariant for Proving Partial Correctness

I'm trying to find a loop invariant so that we can prove this program partially-correct: { n >= 1 } pre-condition i = 1; z = 1; while (i != n) { i = i + 1; z = z + i*i; } { z = n*(n+1)*(2*n + ...
1
vote
1answer
84 views

proof - set of remainders of a prime p multiplied by another co prime

I've solvde the problem nuggets on usaco. I came to a point that I needed to prove that: If we have a set S that contain numbers (0,1,2,3,...P-1) where P is a prime number. If we multiplied this set ...
1
vote
1answer
73 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 ...
0
votes
1answer
80 views

Equality of two algorithms

Consider a tree of depth B (i.e.: all the paths have length B) whose nodes represent system states and edges represent actions. Each action a in ActionSet has a gain and makes the system move from a ...
0
votes
1answer
515 views

How to prove correctness of this algorithm?

I am solving a problem from codeforces. Our job is to find a minimum cost to make a given integer sequence be a non-decreasing sequence. We can increase/decrease any number of the sequence by 1 at ...
0
votes
2answers
153 views

complexity of polygon-construction

I want to proof that the complexity of the problem to construct a simple polygon out of a given set of points (2D) is at least *O(n*logn)*, i.e. every correct algorithm takes at least O(n*logn) steps ...
0
votes
3answers
1k views

Proving Big-O Sum Rule?

I am unsure how to formally prove the Big O Rule of Sums, i.e.: f1(n) + f2(n) is O(max(g1(n)),g2(n)) So far, I have supposed the following in my effort: Let there be two constants c1 and c2 such ...
6
votes
2answers
310 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 ...
7
votes
3answers
382 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 ...
1
vote
2answers
248 views

Is there a way to prove a program has no bug?

I was thinking about the fact that we can prove a program has bugs. We can test it to assess that it is more or less bug resistant. But is there a way (even theoretically) to prove that a program has ...
-1
votes
1answer
272 views

longest common subsequence with linear memory usage [closed]

I'm trying to find an algorithm which uses linear space of memory for: Given two strings x and y over an arbitrary alphabet, determine their longest common sub sequence.
3
votes
1answer
160 views

Mathematical proof for a binary tree

I am not hiding this is a part of my homework but I've tried enough before posting here. So... I need to prove for a binary tree that a node k have its left child on 2k and right child on 2k + 1 ...
0
votes
1answer
163 views

Converting propositional logic argument to Prolog

How do I translate the following argument into Prolog? It seems like it doesn't need predicates. (Note: I use & for a conjunction and | for a disjunction.) G -> (H & J) (H | J) -> S ...
3
votes
4answers
627 views

Minimum count of numbers to be inserted in [a,b] such that GCD of 2 consecutive numbers is 1

This question was asked in TopCoder - SRM 577. Given 1 <= a < b <= 1000000, what is the minimum count of numbers to be inserted between a & b such that no two consecutive numbers will ...
1
vote
3answers
87 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 ...
-1
votes
1answer
179 views

Prove max(O(f(n)), O(g(n)))=O(max(f(n), g(n))

Prove max(O(f(n)), O(g(n)))=O(max(f(n), g(n)) It does make sense, but so far I don't have any idea how to actually prove it. Any input would be appreciated.
0
votes
2answers
153 views

Proving log(n!) is in Ω(n log(n))

The total cost of our operations are: Σ(i=1 to n) log(i). Prove that this sum is Ω(n log(n)). I'm a little bit stuck on how to go about proving this. I realize the summation comes out to be ...
3
votes
2answers
318 views

How do I display a proof tree with HTML,CSS and/or Javascript?

I want to display a proof tree in the style of a natural deduction within a web page. I will get the data from a JSON file. Whats the best way to display something like this? Is it possible only ...
-1
votes
2answers
956 views

Logic deduction with Fitch system

I was working through some logic and I found a difficulty I can't solve, How can I proof from the premise p=>q, that ¬q=>¬p? Thank you
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 ...
0
votes
1answer
254 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 ...