Asymptotic complexity is an approximation of the edge case performance of an algorithm used to determine best and worst case scenarios.

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How should I count the number of operations in my algorithm?

After searching web, I found following solution for step count method. int mean(int a[], size_t n) { int sum = 0; // 1 step * 1 for (int i = 0; i < n; i++) // 1 step * ...
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The height bound of a relaxed red-black tree

A relaxed red-black tree is a red-black tree with the third invariant (no two red nodes in a row) relaxed so that there can be no three reds in a row. I know the height of a red-black tree is bounded ...
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unable to correctly calculate time complexity of delete operation in an array?

Code snippet Following is the delete function definition to delete all the occurrences of an element x in an int type array named a in C language! void delete(int x) { for(int i=0 ; i<size ; ...
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Hash Collision Linear Probing Running Time

I am trying to do homework with a friend and one question asks the average running time of search, add, and delete for the linear probing method. I think it's O(n) because it has to check at certain ...
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1answer
18 views

probabilistic skip list space complexity

So I have seen this question about probabilistic skip list space consumption: (answer) but I think that the asker wasn't clear if he wanted an expected approach or the worst case approach. So I ...
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1answer
259 views

Number of addition and multiplication operators in this algorithm

Consider the following algorithm: i := 1 t := 0 while i ≤ n t := t + i i := 2i I'm interested in finding out how many addition and multiplication operations this algorithm ...
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28 views

HRW rendezvous hashing in log time?

The Wikipedia page for Rendezvous hashing (Highest Random Weight "HRW") makes the following claim: While it might first appear that the HRW algorithm runs in O(n) time, this is not the case. The ...
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1answer
21 views

Asymptotic complexity of string indexing in .NET

Since .NET stores strings in UTF-16 and considering the fact that it's variable length encoding (single code unit can take 2 or 4 bytes). Does it mean that string indexing (s[n]) takes O(n)?
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is O(n) greater than O(pow(2,logn))

I read in a DS book complexity heirarchy diagram that n is greater than pow(2,log n). But cannot understand how and why. On using simple examples in power of 2 as n, i get values equal to n. It is ...
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56 views

Algorithm Analysis: Big Oh Complexity, express output as a function

What is the value returned by the following function? Express your answer as a function of n. Give using O() notation the worst-case running time. Pseudo code of the algorithm: F1(n) v = 0 ...
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1answer
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O(lg(n)) * O(lg(n)) in complexity theory

Stuck with some dumb question in complexity. I have a loop that runs O(lg(n)) time. I have another loop inside that is also O(lg(n)) so the whole complexity is O(lg(n)) * O(lg(n)) or O((lg(n)^2)). ...
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Running time of counting sort

I am trying to understand the running time of counting sort. In my notes, it says, assuming the size of the array A is n, and k is the number of times each number occurs, Counting-Sort(A,k) { for ...
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Threaded Binary Search Trees Advantage

An explanation about Threaded Binary Search Trees (skip it if you know them): We know that in a binary search tree with n nodes, there are n+1 left and right pointers that contain null. In order to ...
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1answer
117 views

How can I implement a collection with O(1) indexing and mutability in Haskell?

If I'm counting the occurences of characters in a string, I could easily implement this using an array in an imperative language, such as the following: char values[256]; char c; while (c = ...
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1answer
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The Recurrence T(n)= 2T(n/2) + (n-1)

I have this recurrence: T(n)= 2T(n/2) + (n-1) My try is as follow: the tree is like this: T(n) = 2T(n/2) + (n-1) T(n/2) = 2T(n/4) + ((n/2)-1) T(n/4) = 2T(n/8) + ((n/4)-1) ... the hight of the ...
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Running time of algorithm A is at least O(n²) - Why is it meaningless?

Why is the statement: The running time of algorithm A is at least O(n²) is meaningless ? The running time of Insertion sort algorithm is at most O(n²) Is it Correct? I tried the net but ...
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1answer
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Exponents in big-O notation

Is 3n = O(2n)? how about (3/2)n = O(2n)? Can you explain the answers? I got false for the first since, 3n grows faster then 2n no matter what constant C you multiply 2n by. And same for the second? ...
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Recursive Runtime of T(n-k)

I am trying to find the runtime of the equation; T(n) = T(n-2) + n³. When I am solving it I arrive at the summation T(n) = T(n-k) + Σk = 0,...,n/2(n-2k)³. Solving that sum I get 1/8(n²)(n + 2)². ...
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44 views

Theta time complexity for loop

What would be the time complexity for this kind of loop in theta notation? for (j=1; j< n^3 ; j=3*j) Is it logn^3? I understand independently when to use logn and when to use n^x but when ...
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Time complexity in n bit array multiplication

Consider an array multiplier for multiplying two n bit numbers. If each gate in the circuit has a unit delay, the total delay of the multiplier is ? Θ(1) Θ(logn) Θ(n) Θ(n^2)
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Graph In-degree Calculation from Adjacency-list

I came across this question in which it was required to calculate in-degree of each node of a graph from its adjacency list representation. for each u for each Adj[i] where i!=u if (i,u) ∈ E ...
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Interview questions

This is an interview question: Given: f(n) = O(n) g(n) = O(n²) find f(n) + g(n) and f(n)⋅g(n)? What would be the answer for this question?
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1answer
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Theta vs. Omega

I'm trying to understand time complexity. If you have an algorithm with a running time of θ(n^2), is it possible to have a best case running time of Ω(n)? Or is the fastest running time only some ...
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Asymptotic time complexity of recursive function (Theta)

I have been asked to analyze the asymptotic time complexity of the following recursion function: for-all k >= 1 : T(n) = n + T(n/2) + T(n/4) + T(n/8) + .... + T(n/2^k) I was able to prove that: ...
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Printing out nodes in Disjoint Set in linear time

I'm trying to do this exercise in Introduction to Algorithms by Cormen et al that has to do with the Disjoin Set data structure: Suppose that we wish to add the operation PRINT-SET(x), which is ...
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Theta Notation for N to the Power of Log Manipulation

In Asymptotic Notations for Order of Growth; Is the form Theta(N ^ ( ( LOGb( a / b) + 1 ) ) ) Equivalent to Theta(N ^ (LOGb( a ) ) ) ?? Where LOGb(a) means LOG a to base b.
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HEAP-INCREASE-KEY complexity

Let A be a heap where instead of storing the values the regular way, only the root is stored regularly and each child is stored as the difference between it and its parent. What is the complexity of ...
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What is the complexity of this algorithm?

I need to calculate the complexity for this code. I understand that it is O(n), but I need an evidence in the formulas. For example, the loop has complexity 1 + 3*n + n*f(body). Code 1: int i = 0; ...
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87 views

What does O(O(f(n))) mean?

I have the understanding about the Big-Oh notation. But how do I interpret what does O(O(f(n))) mean? Does it mean growth rate of the growth rate?
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Lower Bound Omega Notation

I have to prove that some number S is bigger than Ω(|V|), where |V| is the number of vertices. I read the definition of asimptotic notations, but I am still confused with the examples. Fot example, in ...
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Tight asymptotic of brute-force algorithm for creating matrix

Consider the following problem: Given an array R of n elements, construct a matrix M such that M[x,y] = ∑k=x...y R[k] I need to calculate the tight asymptotic bound... e.g. Θ(algorithm) I believe ...
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What is the Big O, Theta O, Omega O for the following code?

for(i = 0; i < n; i++) { j+=i; } Assuming that Big O for the above code is O(2n), what will be Θ ( tight bound ) and Ω (lower bound) for the above code?
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Asymptotic complexity in its simplest form

I'm studying for my computer science exams and I've came across a few questions on simplifying asymptotic complexity and i'm unsure how far too take it. For example: Give '2n log(n) + 3 log(n)' in ...
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How to calculate the complexity of a “not so simple” program?

I know how to calculate the complexity of a program whenever there is a variable declaration or some simple loops are involved (i.e a linear case ) by counting the number of times each line will be ...
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What is the tightest asymptotic growth rate

I have solved all of them however i have been told there are some mistakes, can somebody please help me n^4 - 10^3 n^3 + n^2 + 4n + 10^6 = O(n^4) 10^5 n^3 + 10^n = O(10^n) 10 n^2 + n log n + 30 ...
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What is the runtime complexity if T(n)= n*T(n-1)?

Should I use a tree to solve this ? Or is there an easiest way to solve it? I think it is n! right? Thank you.
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Why does log appear so frequently in algorithmic complexity?

This question is about whether there is some abstract similarity between the solutions that leads to the appearance of log in problems such as sorting and searching. Or, more simply, why does log ...
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Understanding time complexity

First of all I know this is not a direct coding question, but please don't close it as I badly need suggestions on this. I would like to understand and get a good grasp of the time complexity ...
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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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Are the following functions O(x^3)

I'm trying to decide whether the following functions are or can be O(x^3) assuming k=1. I have what I think are the right answers but I'm confused on a few so I figured someone on here could look over ...
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Confused in Big Theta Notation - Asymptotic Notation

I am trying to understand the Big Theta notation and came across an example : I know we have to find two constants c1 and c2 for this notation such that c1*g(n)<= f(n) <= c2*g(n). My question ...
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Confused about Big-O notation

I am new to Big-O notation. While reading I came across an example : Qus : Find upper bound for f(n) = n^2 + 1 Sol : n^2 + 1 <= 2n^2 for all n >= 1 so f(n) = O(n^2) with c = 2 and n0 = 1 ...
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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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Line by Line Analysis of Algorithm with Early Return Statement

I am attempting some homework for an algorithms class and I am running into a situation that is not described in the book. My task is to create an algorithm and perform a line by line analysis of ...
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Prove Asymptotic Notations of Various kinds

I have a few exercise problems for my Algorithms Home-work and I can't seem to figure out on how to proceed with the proofs of the following relations: (Note that some of them are not necessarily true ...
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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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What does it mean when it is stipulated that extra allowed space is O(1)?

If the above condition in a programming question is given and I am solving it using recursion then am I violating the constraints? It could be because recursion also uses stack? Is it right?
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Analysis of for loop

Consider this fragment of code int sum = 0; for( int i = 1; i <= n*n; i = i*2 ){ sum++ ; } How to do a quick proper analysis for it to get order of growth of the worst case running time? ...