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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Running time(big O)) of an algorithm

i m calculating running time for this algorithm? Cost No Of Times for(j=1;j<=n-1;j++){ c1 n(loop will run for n-1 times +1 ...
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1answer
99 views

Instruction execution of a C++ code

Hello I have an algorthm in C++ and I want to find the instructions executed. The code is below cin >> n; for(i=1;i<=n;i++) for (j = 1; j <= n; j ++) A[i][j] = 0; ...
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2answers
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What does it mean when we say the time complexity is O(M+N)?

Is it the same as saying O(max(M,N))? I am learning time complexity and this type of complexity comes up time and again with graphs.I don't fully understand what they mean by O(M+N), where ...
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2answers
150 views

Asymptotic lower bound of O(n^2)

Are there problems in P that have a proven asymptotic lower bound of O(n^2) or higher? (n is the number of bits a problem instance can be represented by). This is not a homework question, just ...
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1answer
56 views

How would you estimate the time complexity for this algorithm?

Let N=number of vertices M=number of edges of a directed graph G.We are storing the edges in the form of an adjacency list. For clarity, let's assume, that Oi is the outdegree of vertex i, and Ii ...
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2answers
199 views

Big O of clojure library functions

Can anyone point me to a resource that lists the Big-O complexity of basic clojure library functions such as conj, cons, etc.? I know that Big-O would vary depending on the type of the input, but ...
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2answers
167 views

F# Flatten Function Efficiency Comparison

I'm trying to compare these two functions to see which has the best algorithm. I been looking at Order of n complexity, and although I don't know how to arrive at it mathematically (which is a shame) ...
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1answer
208 views

Collatz conjecture: loose upper/lower bounds? [closed]

This is a problem from my textbook. The Collatz conjecture (or the "3n + 1" problem) works as follows (given some natural number n): while n > 1 do if n is even then n = n / 2 ...
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2answers
144 views

Building a recurrence relation for this code?

I need to build a recurrence relation for the following algorithm (T(n) stands for number of elemental actions) and find it's time complexity: Alg (n) { if (n < 3) return; for i=1 to n ...
3
votes
4answers
134 views

Complexity for 2n^2 + n

If a problem of complexity 2n^2 + n can be solved in 24 units of time for n = 2, how long does it take for n = 4? I was told that the answer is 48. But I believe it should be 24^2 because the ...
5
votes
1answer
220 views

Asymptotic complexity of printf

Assuming that I'm printing a string, as follows: printf("%s", s); What can we assume the asymptotic complexity of this function is? Is it O(n) where n is strlen(s) - it's length? Or is it somehow ...
4
votes
3answers
647 views

complexity for nested loops

I am trying to figure out the complexity of a for loop using Big O notation. I have done this before in my other classes, but this one is more rigorous than the others because it is on the actual ...
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1answer
160 views

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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1answer
99 views

Asymptotic Estimate for integer division [closed]

k = n; //integer division while(k > 1) { std::cout << k; k=k/2; } I need to find out the asymptotic estimate as a function of n.
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2answers
134 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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1answer
170 views

Coin change but with only 1 of each denomination of coin

The problem is: The algorithm I came up with is something like: pair<bool, bitmask>[n][A] memo; // memo[i][j].first will be true if its possible to // use up to i-th denomination for ...
0
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1answer
167 views

Is this generalization of Big-Theta notation correct?

Say you have an algorithm that completes in a polynomial number of steps for the input of size n, like, for example, P(n)=2n^2+4n+3. The asymptotic tight bound for this algorithm Θ(n^2). Is it true ...
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2answers
268 views

Studying for my final: Asymptotic notation [closed]

I am currently studying for my final in algorithms. This is not a homework problem and comes from an old final exam. Show that f(n) = 4logn + log log n is big theta of logn. It is obvious that ...
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1answer
289 views

Asymptotic complexities of log versus powers

Hey guys I'm working out some big-o problems from the Algorithms book by Dasgupta and am stuck on a few. 1) f(n) = n^0.1 g(n) = (log n)^10 According to the top answer on Asymptotic Complexity of ...
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1answer
126 views

Time complexity of a recursive function

I have a Java function that receives a matrix (2-dimensional array[][]) and creates a dynamic array of options of changes for this array, and then recursively creates a dynamic array for each option ...
2
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1answer
142 views

time complexity of line segment or edge intersection finding algorithms

I briefly reviewed the literature on line intersection and line arrangement problems in computational geometry. Most of them are based on plane sweep algorithm. From the angle of computational ...
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93 views

Is it true or false that, for any algorithm, its average-case performance is always better than the worst-case performance asymptotically

I'd like to think this is true, but I'm not too confident in that answer. Is there an algorithm that has an equal running time in the both the average and worst case. I'm not sure if the answer would ...
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2answers
495 views

Is there any implementation to Remove by Key and get the Value at the same time?

I'm doing a performance critical program (little academic stuff) and I'm looking to optimize wherever possible (not like it proved "this is the" bottleneck). I have a custom dictionary structure (a ...
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votes
1answer
168 views

Giving the Big O, Big Theta and Big Omega for a function [closed]

How can one give Big O, Big Theta or Big Omega for a function like T(n) = n + 10*log n Can someone please tell me how I can get the complexity for such a thing?
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316 views

Interview questions

This is an interview question: Given: f(n) = O(n) g(n) = O(n^2) find f(n) + g(n) and f(n).g(n)? What would be the answer for this question?
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The time complexity of counting sort

I am taking an algorithms course and there I saw that the time complexity of counting sort is O(n+k) where k is the range of numbers and n is the input size. My question is, when the difference ...
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4answers
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Time complexity of the program using recurrence equation

I want to find out the time complexity of the program using recurrence equations. That is .. int f(int x) { if(x<1) return 1; else return f(x-1)+g(x); } int g(int x) { if(x<2) return 1; ...
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1answer
100 views

Running time of the following loop

I am trying to find the running time of the following loop: int m=1; for(i=1;i<=k;i++) { for(j=1;j<=A[i];j++) { B[m]=i; m++; } } Here, A is an array keeping ...
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3answers
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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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2answers
678 views

Different upper bounds and lower bounds of same algorithm

So I just started learning about Asymptotic bounds for an algorithm Question: What can we say about theta of a function if for the algorithm we find different lower and upper bounds?? (say omega(n) ...
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Big O for worst-case running time and Ω is for the best-case, but why is Ω used in worst case sometimes?

I'm confused, I thought that you use Big O for worst-case running time and Ω is for the best-case? Can someone please explain? And isn't (lg n) the best-case? and (nlg n) is the worst case? Or am I ...
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asymptotic-complexit - Calculate steps of primitive operations

I've some difficulties understanding how i should calculate the primitive operations of the following algorithm. I know that the calculations of the steps is somehow like this: (1) = 1 step: ...
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1answer
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Complexity of inserting n numbers into a binary search tree

I have got a question, and it says "calculate the tight time complexity for the process of inserting n numbers into a binary search tree". It does not denote whether this is a balanced tree or not. ...
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2answers
252 views

Algorithm analysis (big-O) for algorithm

I'm trying to help a friend analyze the complexity of his algorithm but my understanding of Big-O notation is quite limited. The code goes like this: int SAMPLES = 2000; int K_SAMPLES = 5000; int i ...
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2answers
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Is (log n)^k = O(n^1/2)? For k greater or equal to 0 [closed]

In big-O notation is O((log n)^k) = O(log n), where k is some constant right? So what's happening with the (log n)^k when k>=0?
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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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3answers
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time complexity for the following

int i=1,s=1; while(s<=n) { i++; s=s+i; } time complexity for this is O(root(n)). I do not understood it how. since the series is going like 1+2+...+k . please help.
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How can we denote the following function in terms of big-O notation?

I have got a function and want to denote it in terms of bigO notation. f(n) = log4n+n*(1/3). Is this function O(n)? Thanks for your help
5
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Computational complexity of a piece of code

I have got a program, and trying to compute its complexity. I want to be sure i am not mistaken for(int i=4; i<=n; i=i*4) { cout<<"counter for first loop: "<<++count1<<endl; ...
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Computational complexity of for loops-Contradicting with myself

I have a contradiction by analyzing the running time of a program. For example, consider the following piece of code: for(int i=0;i<n;i++) { for(int j=0;j<n;j++) { ..... } ...
0
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1answer
51 views

Number of times a code is executed [closed]

I have a piece of code that says: for i = 4,16, . . . , n I am trying to find an upper bound in terms of big oh notation for the number of times the statement gets executed. I believe here it ...
5
votes
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Asymptotic analysis of three nested for loops

I want to calculate the theta complexity of this nested for loop: for (int i = 0; i < n; i++) { for (int j = 0; j < i; j++) { for (int k = 0; k < j; k++) { ...
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0answers
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Merge algorithm with arrays split in c>2 ways

As an example question we are asked to create a variant of merge sort where it splits array in to c>2 arrays of roughly equal size (when c = 2 it will use regular merge) This is the solution: ...
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1answer
100 views

Big Oh Notation prob

Is 3^n = O(2^n) how about (3/2)^n = O(2^n) ? Can you explain the answers? I got false for the first since, 3^n grows faster then 2^n no matter what constant C you multiply 2^n by. And same for the ...
5
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1answer
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How can the lower bound for matrix sorting be found?

Consider the problem of sorting an n x n matrix (i.e. the rows and columns are in ascending order). I want to find the lower and upper bound of this problem. I found that it is O(n^2 log n) by just ...
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1answer
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Complexity function

could you help me to determine whether the following function of complexity: f(n)=5n^3+1800nlogn+18 is of order O(n^2), O(n^4), OMEGA(n^3),OMEGA(n^5),TETA(n^3),TETA(n^5) I think it is O(n^4), ...
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2answers
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solving recurrence examples of form T(n-i) + f(n) [closed]

I've been working on a problem set for a bit now and I seem to have gotten the master method down for recurrence examples. However, I find myself having difficulties with other methods (recurrence ...
0
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3answers
371 views

Asymptotic Expected Running Time

I'm having some trouble with an asymptotic analysis question. The problem asks for both the asymptotic worst case running time and the asymptotic expected running time of a function. Random(n) ...
3
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1answer
2k views

If f(n)=O(g(n)), then shouldnt f(n)∗log2(f(n)^c)=O(g(n)∗log2(g(n))) depend on the value of C?

If f(n)=O(g(n)), then shouldn't f(n)∗log2(f(n)^c)=O(g(n)∗log2(g(n))) depend on the value of C? Here C is a positive constant. According to me if C is large then the statement would become false and ...
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Is there a library for programmatic manipulation of Big-O complexities?

I'm interested in programming languages that can reason about their own time complexity. To this end, it would be quite useful to have some way of representing time complexity programmatically, which ...