# 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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### 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). ...
71 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 ...
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 = ...
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### 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 ...
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### 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 ...
914 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 ...
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### 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 ...
256 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 ...
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### 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 ...
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### 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 ...
172 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 ...
131 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 ...
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### 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 ...
724 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 ...
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### 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.
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### 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 ...
120 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 ...
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### 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.
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### 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 ...
116 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 ...
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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 ...
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### 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. ...
131 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 ...
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### Can someone help me with this proof using the pumping lemma?

I just started reading about the pumping lemma and know how to perform a few proofs, mostly by contradiction. It is only this particular question which I don't seem to find an answer for. I have no ...
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### 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 ...
118 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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### 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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### 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 ...
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### 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 ...
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### 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 ...
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### How can I prove the following logic statement deductively? [closed]

I have the following logic statement: If (P OR Q) and (P => Q) and (Q => P) Then (P AND Q) I'm told to use Dorothy's Law, which is: If (A => B) Then (A OR B => B) I can't ...
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### Are there flaws in my Greedy algorithm?

I was just wondering if you could see any flaws or problems with my Greedy algorithm I've come up with to solve this problem. The problem is: They're a set of employees Each employee has one work ...
251 views

### compress 2-bit numbers and save 1 bit use compression scheme

I want to create a compression scheme for 2-bit numbers such that it will reduce the size of any sequence by at least one bit. How can I prove this is not possible?
334 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 ...
763 views

### Show that n^2 is not O(n*log(n))? [closed]

Using only the definition of O()?
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### Huffman minimum variance coding

it is well known that Huffman code with minimum variance is preferable. I've digged through entire Polish/English internet and this is what I found: to build Huffman code with minimum variance you ...
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### 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 ...
265 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 ...
1k views

### Prove that n! is not in O(n^p) for any constant natural number p

How can I prove that n! is not in O(n^p) for any constant natural number p? And is (n k)(n choose k) in O(n^p), for all k?
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### 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 ...
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### In Coq, which tactic to change the goal from `S x = S y` to `x = y`

I want to change the goal from S x = S y to x = y. It's like inversion, but for the goal instead of a hypothesis. Such a tactic seems legit, because when we have x = y, we can simply use rewrite and ...
144 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, ...
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### Proving an algorithm's correctness in determining the number of 1 bits in a bit string

procedure bit count(S: bit string) count := 0 while S != 0 count := count + 1 S := S ∧ (S − 1) return count {count is the number of 1s in S} Here S-1 is the bit string ...
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### 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 ...
131 views

### Proving NP complexity

I'm learning how to prove something is NP. In Thomas Cormen's intro to algorithm book, he states something is NP if given a solution to some problem, you can verify it is correct in polynomial time. ...
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### 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. ...
598 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 ...
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### looking for similar known problems

I am trying to prove the computer complexity of this optimization problem: Given a connected graph G = (V, E) and a set S ⊊ V. Find a connected subgraph G'= (V', E ') that: Min f(G') Min |V'| ...