Tagged Questions

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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121 views

Fitch-Style Proof

Hi I'm having trouble solving a Fitch Style Proof and I was hoping someone would be able to help me. Premises: A ^ (B v C) B => D C => E Goal: ~E => D
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99 views

How to prove that “Total” is not recursive (decidable) [closed]

Halt = { f,x | f(x)↓ } is re (semi-decidable) but undecidable Total = { f | ∀x f(x)↓ } is non-re (not even semi-decidable) I need some help in proving that the Total problem is not recursive ...
0answers
68 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? ...
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75 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 ...
1answer
382 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 + ...
1answer
130 views

How can I prove the correctness of the following algorithm?

Consider the following algorithm min which takes lists x,y as parameters and returns the zth smallest element in union of x and y. Pre conditions: X and Y are sorted lists of ints in increasing order ...
0answers
295 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 ...
1answer
154 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). ...
3answers
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(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 ...
1answer
370 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 ...
2answers
71 views

How can I prove a type is valid in Agda?

I'm trying to do proofs over dependent functions, and I'm running into a snag. So let's say we have a theorem f-equal f-equal : ∀ {A B} {f : A → B} {x y : A} → x ≡ y → f x ≡ f y f-equal refl = refl ...
1answer
91 views

Z3Py: Generating Abstract Formulas From A System Of Equations

My Example: system of equations Pseudo-Code Constraint Base a = b+c ∧ e = a*c ∧ a = +2 ; some replaceable concrete values ∧ c = +18 Solution b = -16 ∧ e = -32 The Information I Want ...
2answers
235 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 ...
1answer
47 views

How to use obvious facts in Agda proofs with “with”?

I had trouble writing a proof in Agda. So I simplified it, a lot. ffff : bool -> bool ffff x with x , x ffff x | t , t = t ffff x | f , f = t ffff x | t , () ffff x | f , () with the ...
2answers
342 views

Proving/Disproving BigO, and BigTheta

I am having issues fully understanding how to prove some of the following statements. For instance I have a statement: n^2logn = O(n^2). Correct me if I am wrong, but this states that n^2 is bigO of ...
2answers
237 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 ...
2answers
617 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 ...
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343 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 ...
2answers
533 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.
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69 views

Using induction to prove linear maximum subarray algorithm

Here's my implementation of Kadane's algorihm that I wrote OCaml: let rec helper max_now max_so_far f n index = if n < index then max_so_far else if max_now + f index < 0 then helper 0 ...
1answer
87 views

Membership proofs for AVL trees

I'm struggling a little to come up with a notion of membership proof for Data.AVL trees. I would like to be able to pass around a value of type n ∈ m, to mean that n appears as a key in in the AVL ...
1answer
113 views

prove bubble sort is ordered by lemma

I already tried to prove that fun bubble_main is ordered but no approach seems to work. Could someone here help me to prove the lemma is_ordered (bubble_main L) please. I just delete all my previous ...
1answer
82 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 ...
1answer
79 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 ...
2answers
165 views

Proving a theorem using induction in COQ

I am learning Coq at school, and I have an assignment to do for home. I have a lemma to proove: If a list contains a zero among its elements, then the product of its elements is 0. I started my code, ...
1answer
89 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 ...
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500 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 ...
1answer
140 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 ...
3answers
233 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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1k views

Two's complement proof

Is it possible to prove by induction that the two's complement of any string of 0's will always result in 0, for all sequences of length n? I'm trying to do this using the value formula, i.e. value ...
2answers
90 views

Proving correctness of algorithm

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 ...
1answer
52 views

Unresolved meta-variables in equivalence proof

I'm trying to derive a commutative monoid of AVL trees of element type A, given a commutative monoid (A, +, epsilon), where the derived operation is unionWith +. The notion of equivalence for AVL ...
1answer
108 views

Why CRC 32 Generator is not divisible by 11?

The CRC 32 Generator is a 33 bit bin number: 100000100110000010001110110110111 According to the PDF Page 18, Odd number of bit errors can be detected if C(x) contains the factor (x + 1) ...
1answer
421 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 ...
1answer
72 views

Why is there only one possible implementation of the *id* function?

I have seen multiple times the claim that one can proof that a function with type signature α → α can only be implemented by returning the argument, because we don't know anything about the type ...
1answer
298 views

Using Omega to prove a lemma in Coq

I am trying to make a proof in Coq using Omega. I spent a lot of time on it, but nothing came to me. I have to say I am new in Coq, so I am not at ease with this kind of language, and I do not have ...
2answers
444 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 ...
1answer
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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 ...
1answer
2k views

Proof for depth of balanced search tree

If T is a balanced BST with n elements, L its left subtree and R its right one, how can I prove that its depth is less than or equal to 2log(n) + 1? There is a proof by induction which I have but I ...
1answer
20 views

Necessary and Sufficient vs Soundness and Completeness

I am trying to learn proof. I came across these 4 terms. I am trying to relate all. A: X>Y B: Y<X Necessary Condition B implies A Sufficient Condition A implies B ...
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19 views

How to prove that Greedy approaches will not work

For any given problem where greedy approaches will not give optimal value, we can find a counter example to disprove that approach. However, is it possible to prove that for a given problem, any ...
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63 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 ...
2answers
44 views

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): ...
1answer
79 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 ...
1answer
47 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. ...
1answer
38 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 ...
1answer
339 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 ...
1answer
441 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 ...
1answer
71 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 ...
3answers
82 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 ...