Computational complexity theory is a branch of the theory of computation in theoretical computer science and mathematics that focuses on classifying computational problems according to their inherent difficulty. Particularly common in programming is *amortized analysis* for time or space

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How to find the cubes passed through by a triangle

Given a triangle with vertice A, B and C in 3D world and a axis-aligned bounding cuboid with length*width*height=nd*md*ld(n, m, l are integers and d is float) containing it, partition the cuboid into ...
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Time complexity of a simple algorithm

Hello and sorry for my bad english. I'm still trying to estimate a complexity of a following algorithm. There is: int f = 1, n, x, licznik = 0; printf("Variable of n: "); scanf("%d", &n); ...
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Proper oracle for proving P^A=PSPACE^A

i would like to ask a question about oracles in complexity theory. What would be a proper language to use as an oracle so i can prove that P^A=PSPACE^A. I guess that i need a language that would ...
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Communication complexity

I am sending strings to a server and want to calculate the complexity. For each string s I am sending all prefices of s. Therefore I start by sending one character, then two characters, then three ...
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. Find the complexity of your algorithm [on hold]

Define an algorithm that finds the total number of duplicated items in an array of positive and negative integers. Find the complexity of your algorithm.
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Relativising resultant theorem

I would like to ask a question about Ladner's theorem in complexity theory. Is it relativising resultant..?Could anyone give me a clear definition of what it means to be relativising resultant..? ...
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N+N/2+N/4… iteration runtime

I'm looking at a code example that iterates through an array of size N. First iteration, I'm going through all the elements -> N Next iteration, I'm only going through half of the array -> N/2 ... ...
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43 views

levenshtein distance implementation with path reconstruction asymptotic complexity

can someone help me on define asymptotic complexity of these two C functions ? 1) Simple function which outputs the levenshtein distance of two given strings int levenshtein_distance( char *s1 , ...
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36 views

Complexity in Dijkstras algorithm

So I've been attempting to analyze a specialized variant of Dijkstras algorithm that I've been working on. I'm after the worst case complexity. The algorithm uses a Fibonacci Heap which in the case ...
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88 views

worst and average complexity of algorithm?

Input is a list L of a number of 1's (or none) followed by a number of 2's (or none). The algorithm below finds the number of 1's. For average case, assume L has equal chance of containing a 1. A(L): ...
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What is considered a cubic algorithm when considering time complexity?

So I've implemented this algorithm and after analyzing its time complexity I've found that its upper bound is restricted by O(n^2*m) where n is the number of vertices in a graph and m is the number of ...
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1answer
24 views

Do recursive calls count into space complexity?

When an algorithm doesn't use more than a constant amount of auxiliary memory but does have O(log(N)) recursive calls (each one taking some extra space on the stack), is that algorithm's space ...
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141 views

What's the memory complexity of std::sort() and std::sort_heap()?

As in the title - what's the memory complexity of std::sort() and std::sort_heap()? (The latter requires std::make_heap() so I'd like to know its memory complexity as well.) I've tried searching on ...
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complexity in time of Merge sort

I'm triying to compare the complexity in time (time execution) of differents sorting algorithme. So i'm making comparaison between Bublle sort, insertion sort, quick sort and fusion sort(merge sort). ...
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5answers
49 views

Big O notation (Complexity)

What is the Big O of this loop? -> i understand that the loop itself is going to execute n times. But the task inside of the loop also executes n times right? So would that make this a O(n^2) or do i ...
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1answer
126 views

Time-complexity of recursive algorithm for calculating binomial coefficient

I'm studying about algorithm complexity analysis. I have problem with unconformity or C(n, k). int C(int n, int k){ if(n==k || k==0) return 1; return C(n-1, k) + C(n-1, k-1); } How can I ...
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1answer
31 views

Challenge on Alphabet and Formal Grammar and Language

We know set A is countable if A is finite or in a one-to-one mapping to natural numbers. Suppose ALPH be an arbitrary finite alphabet. I summarize my inference: a) Each arbitrary Language on ALPH ...
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1answer
36 views

Cook's Theorem (in plain English)

I read the book Computers and Intractability - A Guide to the Theory of NP-Completeness by Garey and Johnson for my algorithms course; however, upon reviewing the material a year later, I realized ...
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3answers
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Are 2^n and 4^n in the same Big-Θ complexity class?

Is 2^n = Θ(4^n)? I'm pretty sure that 2^n is not in Ω(4^n) thus not in Θ(4^n), but my university tutor says it is. This confused me a lot and I couldn't find a clear answer per Google.
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Asymptotic worst-case running time. Need some clarification

For the pseudocode below for the mystery(n) function below, find tight upper and lower bounds in its asymptotic worst-case running time f(n). That is, find g(n) such that f(n) ∈ Θ(g(n)). ...
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1answer
57 views

Big O notation of a program (Worst-Case)

I have a question regarding complexity theory. If I have a Bubble sort algorithm and I want to find its worst case running time Big O, we can conclude that it is O(n^2). Now, what about If I have a ...
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53 views

Worst-case running time Big O

Could you please explain how I can get the worst-case Big O of this algorithm. I was reading my textbook and I came across a similar algorithm like this one but still don't understand the logic behind ...
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Optimizing a very simple O(n^3) algorithm to a O(n^2) algorithm.

I've been stuck on this question for a very long time. Let X, Y, and Z be sets of n integers. Let k be any integer. The question "Can you find an x in X, y in Y and z in Z such that x + y + z = k" can ...
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How do I calculate the complexity/completeness of a best first search?

To solve my problem, at every step, I perform somewhat like a best first approach: I need to analyze five possible child nodes and select one based on a heuristic. The number of inputs always stay the ...
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37 views

Time complexity of this while loop:

What is the time complexity of this loop since it does not iterate by 1: while (parser.hasNext()) { token = parser.next(); if (isOperator(token)) ...
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How to prove that TMSAT is NPC?

I know how to prove TMSAT is in NP but don't know how to get started with proving that any language in NP can be reduced to TMSAT?
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33 views

Complexity of Knuth's algorithm for variance

The algorithm is this: def online_variance(data): n = 0 mean = 0 M2 = 0 for x in data: n = n + 1 delta = x - mean mean = mean + delta/n M2 = M2 + ...
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Having trouble finding time-complexity of nested for loop

So I've been trying to find big-Oh complexity using the following algorithm: for (i = 1; i ≤ n;i + +) for (j = 0; j < n; j = j + i) print(Array[j]); I was told that the optimal ...
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Why can't we use O-Notation to compare algorithms?

From my textbook: O-notation and Complexity of Algorithms It is important not to try and make comparisons between algorithms using O-notation. For example, suppose algorithm A1 and A2 ...
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Is the only way to prove P = NP is giving a polynomial algorithm to a NP-complete?

The only way to prove P = NP is giving a polynomial algorithm to a NP-complete problem? Is this right?
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56 views

Which is asymptotically larger:(lgn)^lg(lgn) or [lg(lgn)]^lgn

Which is asymptotically larger:(log n)^log(log n) or [log(log n)]^log n(^ denotes power) I took the logarithm on both sides and was confused to judge which one is greater among the two
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26 views

Time Complexity of Dependent Nested Loop

Hi I've been trying to understand what the time complexity of this nested loop will be for a while now. int i = 1; while(i < n) { int j = 0; while(j < n/i){ j++; } i = ...
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Is this algorithm O(1)?

Is the following algorithm simply O(1), or is its complexity trickier to define? for (i = 0; i < n; ++i) if (i > 10) break; I'm confused by the fact that it's obviously O(n) when ...
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if something is little o of f(n) is it also big O of f(n)?

I had a question about Big O vs little o notation. It seems intuitively, that Big O is like <= while little o is like <. Does that mean that if something is little o of f(n), it is also Big O of ...
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110 views

Complexity asymptotic relation (theta, Big O, little o, Big Omega, little omega) between functions

Let's define: Tower(1) of n is: n. Tower(2) of n is: n^n (= power(n,n)). Tower(10) of n is: n^n^n^n^n^n^n^n^n^n. And also given two functions: f(n) = [Tower(logn n) of n] = n^n^n^n^n^n^....^n (= ...
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82 views

Finding the Big-theta notation of a Function

So I have a loop embedded inside a loop here: int a,b,n; for (a = 1; a <=n; a++) { for (b = 0; b < n; b+=a) cout << "hey" << endl; } n is a power of 2 I'm trying to ...
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1answer
37 views

Polynomial time approximation of knapsack

The knapsack problem can be solved in O(n²V) time where V = max(v[i], i = 1,..,n) denotes the maximum value of any item. If we "change units" by a rounding parameter θ = ε/n * V and consider modified ...
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151 views

Analyzing worst case order-of-growth

I'm trying to analyze the worst case order of growth as a function of N for this algorithm: for (int i = N*N; i > 1; i = i/2) for (int j = 0; j < i; j++) { total++; } ...
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How to compute the complexity of this?

int foo(int n) { int sum = 0; for(int k=1; k <= n; k = k * 2) { sum += k; } return sum; } I have the following function. Now, according to me the runtime complexity ...
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1answer
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Why ZIP is so efficient on System.Random generated sequences - where is Kolmogorov complexity?

I'm generating sequences of random numbers. Sequences include only 0's and 1's. I put every sequence in a separate text file and then I try to archive the file (to .zip format). I'm using ...
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4answers
111 views

Time Complexity of a printf()?

I'd like to determine time complexity of a printf such as: { printf("%d", i); } Or: { printf("%c", array[i]); } Is it correct to assume that time complexity of a ...
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1answer
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NP-Hardness proof for constrained scheduling with staircase cost

I am working on a problem that appears like a variant of the assignment problem. There are tasks that need to be assigned to servers. The sum of costs over servers needs to be minimized. The following ...
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2answers
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What is the time complexity of the code?

Is the time complexity of the following code O(NV^2)? for i from 1 to N: for j from 1 to V: for k from 1 to A[i]://max(A) = V z = z + k
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32 views

Complexity of iterated logarithm on base 2

Assuming iterated logarithm is defined as it is here: http://en.wikipedia.org/wiki/Iterated_logarithm How should I go about comparing its complexity to other functions, for example lg(lg(n))? So far ...
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43 views

Sort and binary search or just linear search?

Problem The time complexity of a selection sort is n*(n-1)/2. Given a list of 1000 items, how many worst case searches using linear search must be needed before it is faster to sort and use binary ...
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Amortized analysis of an ordered stack

I was working through a tutorial sheet I found online and came across a question I couldn't figure out how to solve. http://www.bowdoin.edu/~ltoma/teaching/cs231/fall08/Problems/amortized.pdf An ...
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How do I count the number of operations in an algorithm that uses a max function?

I have to obtain the operation count of the following pseudo code: x(1) = b(1) / L(1,1); for j = 2 : n sum = 0; for k = (j-1) : max(1,j-m) sum = sum + L(j,k) * x(k); end x(j) ...
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What is the order of growth of the worst case running time of the following code fragment as a function of N?

int sum = 0; for (int i = 1; i <= N; i = i*2) for (int j = 1; j <= N; j = j*2) for (int k = 1; k <= j; k++) sum++; According to the solution it is NlogN. However, I ...
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Algorithmic complexity of checking if an element exists in an array [closed]

If I have an array of unsorted numbers and a number I'm looking for, I believe there's no way of checking if my number is in it except by going through each member and comparing. Now, in mathematics ...
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45 views

Subset product & quantum computers, is an instance solvable [closed]

Suppose you have a quantum computer that can run Shor's algorithm for factorization of integers. Is it then possible to produce an oracle that determines if no solution exists for an instance of the ...