# 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 ...

950 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. ...
293 views

### 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 ...
244 views

### What does cpython do to help detect object cycles(reference counting)?

From what I've read about cpython it seems like it does reference counting + something extra to detect/free objects pointing to each other.(Correct me if I'm wrong). Could someone explain the ...
567 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 ...
3k 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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### Using an equivalence in the context to force reduction

The setting for this question is the same "merge of sorted lists" example from this earlier question. {-# OPTIONS --sized-types #-} open import Relation.Binary open import ...
766 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 ...
3k 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 ...
1k views

### Rendering PDF proofs with Java (via LaTex?)

Currently I am working on a automated theorem prover in Java. I would like to be able to render these proofs, as PDF. Preferrably, this will go though something like LaTeX, using proof.sty or ...
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?
424 views

### How to prove that the C statement -x, ~x+1, and ~(x-1) yield the same results?

I want to know the logic behind this statement, the proof. The C expression -x, ~x+1, and ~(x-1) all yield the same results for any x. I can show this is true for specific examples. I think the way ...
527 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 ...
94 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 ...
160 views

### 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 ...
951 views

### 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 ...
346 views

### Have I checked every consecutive subset of this list?

I'm trying to solve problem 50 on Project Euler. Don't give me the answer or solve it for me, just try to answer this specific question. The goal is to find the longest sum of consecutive primes that ...
92 views

### Coq “Error: No focused proof” when using “Arguments” command

I am working through the Software Foundations book. In the chapter on polymorphism, there is a section on "Implicit Arguments". In this section, there is the line: Arguments nil {X}. When I try to ...
196 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 ) ...
971 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 ...
424 views

### How do I write Ax ( P(x) and Q(x) ) in Coq?

I'm trying out Coq, but I'm not completely sure what I'm doing. Is: Theorem new_theorem : forall x, P:Prop /\ Q:Prop Equivalent to: Ax ( P(x) and Q(x) ) (where A is supposed to be the universal ...
104 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 ...
110 views

### 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 ...
274 views

### Should languages offer a syntactic alternative to method chaining? [closed]

DOM, ThreeJS and now canvas have all had libraries written to provide method chaining (perhaps most familiar from jQuery). Chaining has also been used in core C libraries. These fluent interfaces ...
158 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 ...
46 views

### defining Maybe monad in Coq

I want to define Maybe monad using type class in Coq. Monad inherits Functor. I want to prove Some (f x') = fmap f (Some x'), which is one of the monad laws. I used compute, reflexivity and destruct ...
79 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 ...
74 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 ...
4k 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 ...
175 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 : ...
845 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 ...
170 views

### How can I show that a function is always not commutative

I have the following vexing problem. I have implemented the following function: function bool less(nat x, nat y) { if (y<>0) then if (x<>0) then return ...
189 views

### Explaining algorithm proofs in plain English

I'm a programmer who never studied Algorithms formally, and have always wanted to fill in that gap in my learning. I'm currently working my way through some books and online material, and I understand ...
91 views

### 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'| ...
421 views

### Proving that the distance values extracted in Dijkstra's algorithm is non-decreasing?

I'm reviewing my old algorithms notes and have come across this proof. It was from an assignment I had and I got it correct, but I feel that the proof certainly lacks. The question is to prove ...
64 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 ...
252 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 + ...
110 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 ...
193 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 ...
2k 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 ...
335 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 ...
100 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). ...
83 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 ...
193 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 ...
58 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 ...
175 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 ...
324 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 ...
446 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.
65 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 ...