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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Good Book for Asymptotic Analysis [closed]

I was looking for a good resource on Asymptotic Analysis. Now I am not looking for a book that tells me "the runtime of this algorithm is O(N)". I want to find a book that teaches me how to actually ...
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Solving for Big Theta Notation

I'm having an issue solving for big theta notation. I understand that big O notation denotes the worst case and upperbound while Omega notation denotes the best case and lower bound. If I'm given an ...
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107 views

Is O(LogN) == O(3LogN)?

I just started a course on Asymptotic Analysis and in one of our assignments I am supposed to add functionality to a function without changing the complexity. The complexity is log(N). The homework ...
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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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When do floors and ceilings matter while solving recurrences?

I came across places where floors and ceilings are neglected while solving recurrences. Example from CLRS (chapter 4, pg.83) where floor is neglected: Here (pg.2, exercise 4.1–1) is an example ...
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Determining Asympotic Notation

I have a set of problems where I am given an f(n) and g(n) and I am supposed to determine where f(n) is O(g(n)), Ω(g(n)) or Θ(g(n)) And I must also determine the c(s) and n0 for the correct ...
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If f(n) = o(g(n)) , then is 2^(f(n)) = o(2^(g(n)))?

Notice that I am asking for little-o here (see similar question here) - for big Oh it's clearly wrong - for little-o it feels right but can't seem to prove it... EDIT: glad I raised a debate :) ...
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Complexity of Multi Stage graph

I was looking through "Fundamentals of Computer Algorithms" book for multi stage graph problem. It says: Algorithm Graph(G,k,n,p) { cost[n]=0; for j=n-1 to 1 step -1 do { Let r be a vertex such ...
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1answer
158 views

Exotic functions, Pochhammer and red-black trees

Consider an initially empty RB-tree, which we insert m elements into. Inserting an element takes O(log n) time, where n is the current number of elements inserted. So I can write up the total time of ...
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447 views

Asymptotic Notation

This is a problem on Asymptotic Notation from the assignment of MIT OpenCourse Introduction to Algorithm: For each of the following statements, decide whether it is always true, never true, or ...
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asymptotic time complexity of scheme functions

I am trying to teach myself scheme and the concept I am struggling with the most is space and time complexity. I was doing some of the exercises at the end of the chapter and I have not been able to ...
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1answer
201 views

better faster scheme function?

So finding the maximum element in a list takes O(n) time complexity (if the list has n elements). I tried to implement an algorithm that looks faster. (define (clever-max lst) (define (odd-half ...
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Merge sort worst case running time for lexicographic sorting?

A list of n strings each of length n is sorted into lexicographic order using the merge sort algorithm. The worst case running time of this computation is? I got this question as a homework. I know ...
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2answers
694 views

Give an asymptotic upper bound on the height of an n-node binary search tree in which the average depth of a node is Θ(lg n)

Recently, I'm trying to solve all the exercises in CLRS. but there are some of them i can't figure out. Here is one of them, from CLRS exercise 12.4-2: Describe a binary search tree on n nodes ...
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95 views

An Example for Non-Monotone Worst-Case Complexity

Is somebody aware of a natural program or algorithm that has a non-monotone worst-case behavior? By non-monotone worst-case behavior I mean that there is a natural number n such that the worst-case ...
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Calculating Time Complexity.. Need help coming up with the end result

Studying for a midterm tomorrow, and these time complexities are something I struggle with. I'm going over the simple examples in the book and for this example Exchange Sort void exchangesort (int ...
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3answers
656 views

What does 'log' represent in asymptotic notation?

I understand the principles of asymptotic notation, and I get what it means when something is O(1) or O(n2) for example. But what does O(log n) mean? or O(n log n) for example?
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1answer
319 views

dynamic programming - what's the asymptotic runtime?

I'm teaching myself dynamic programming. It's almost magical. But seriously. Anyway, the problem I worked out was : Given a stairs of N steps and a child who can either take 1, 2, or 3 steps at a ...
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320 views

Big O in an exponent

What in an exact formal manner does the expression f(n) = 2^O(n) mean?
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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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Object oriented programming and asymptotic run-time

Are some ways of structuring a class hierarchy more efficient than others? Is there a way to measure this? How do design patterns factor in to computational complexity? Am I just thinking about this ...
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Asymptotic time complexity of inserting n elements to a binary heap already containing n elements

Suppose we have a binary heap of n elements and wish to insert n more elements(not necessarily one after other). What would be the total time required for this? I think it's theta (n logn) as one ...
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The fastest algorithm to find the largest span (i,j) such that , ai + ai+1 +…+aj = bi + bi+1 +…+bj in arrays a and b

I encountered this problem while preparing for my exams. Given two arrays of numbers a1,..., an and b1,....,bn where each number is 0 or 1, the fastest algorithm to find the largest span (i,j) such ...
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213 views

Runtime of this pseudocode

Can anyone help me analyze the run time of the following pseudocode for(i = 0; i < n*n*n; i++) for(j = i; j < n; j++) x++ The way I see it's omega(n^3) for the lower bound, since ...
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Asymptotic Complexity of Logarithms and Powers

So, clearly, log(n) is O(n). But, what about (log(n))^2? What about sqrt(n) or log(n)--what bounds what? There's a family of comparisons like this: n^a versus (log(n))^b I run into these ...
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Alorithmic complexity of recursive function

Here is my function. It is a simple one, I'm just not confident on what the answer is. int calcul( int n) { if(n=1) return 1; else return calcul(n/2) + 1; } Now, to get the ...
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Multiplying and adding different asymptotioc notations

does anyone knows how to perform such calculations Example: O(n^2) + THETA(n) + OMEGA(n^3) = ? or O(n^2) * THETA(n) * OMEGA(n^3) = ? In general, how to add and multiply different asymptotic ...
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1answer
789 views

Asymptotic comparison of functions

I want to compare following functions asymptotically and then arrange them in the ascending order .Could some one help me out.Also requested is a proper explanation lg((√n)!), lg(SquareRoot(n!)), ...
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Big O notation for exponential and logarithmic complexity

There are a lot of questions about big O notation, but I didn't found clear answer for this question. We write that: O(5n) = O(n) and O(3n^2 + n + 2) = O(n^2) Can we write that: O(2^(2n)) = O(2^n)? ...
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Give both an exact and asymptotic answer for the pseudo code below

for i <--- 1 step i <--- 2* i while i< n do for j <--- 1 step j <---2* j while j<n do if j = 2*i for k = 0 step k <--- k+ 1 while k < n do .... CONSTANT ...
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asymptotic tight bound for quadratic functions

In CLRS (Introduction to Algorithms by Cormen, Leiserson, Rivest, and Stein), for a function f(n) = an2 + bn + c they said Suppose we take the constants c1 = a/4, c2 = 7a/4, and n0 = ...
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Question about big O and big Omega

I think this is probably a beginner question about big-O notation. Say, for example, I have an algorithm that breaks apart an entire list recursively(O(n)) and then puts it back together (O(n)). I ...
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Top K smallest selection algorithm - O (n + k log n) vs O (n log k) for k << N

I'm asking this in regards to Top K algorithm. I'd think that O(n + k log n) should be faster, because well.. for instance if you try plugging in k = 300 and n = 100000000 for example, we can see that ...
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Big Oh notation (how to write a sentence)

I had a test about asymptotic notations and there was a question: Consider the following: O(o(f(n)) = o(f(n)) Write in words the meaning of the statement, using conventions from asymptotic ...
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What is the time complexity for inserting n elements in a stack using a linked list?

Each insertion in a stack is O(1) so is the time taken to insert 'n' elements O(n) ? Can we speak similarly for a hash-table as well ? In average case the time taken to insert 'n' elements in a hash ...
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Big-O Notation, Find the Smallest

Give the smallest O() estimate you can for the following functions: 4n2 + 5n – 8 = O(...) log(n)2 + n = O(...) If you guys can, explain the answer rather than giving it to me. A question like ...
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Adding a log in asymptotic analysis

Have a problem I'm trying to work through and would very much appreciate some assistance! What's the time complexity of... for (int j = 1 to n) { k = j; while (k < n) { sum += a[k] ...
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efficiency of the closest pair algorithm

In T(n) = 2T(n/2) + M(n), where does the 2 in front of T come from. n/2 because it is dividing, and M(n) is linear, but I can't figure out what the 2 is for?
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T(n) = T(n/2) + T(n/4) + O(1), what is T(n)?

What is the answer? And how to solve this recurrence? It doesn't seem like Master Method will help, as this is not in the form of T(n) = aT(n/b) + f(n). And I got stuck for quite a while. Thank you! ...
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Asymptotic analysis question: sum[log(i)*i^3, {i, n}] is big-theta (log(n)*n^4)

I've got a homework question that's been puzzling me. It asks that you prove that the function Sum[log(i)*i^3, {i, n}) (ie. the sum of log(i)*i^3 from i=1 to n) is big-theta (log(n)*n^4). I know that ...
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487 views

time complexity of an algorithm

An algorith with size n=100 takes 21 seconds to run. With size n=1000 it takes 31 seconds and with n=10000 takes 41 seconds to run. What is the running complexity? If I try O(n) Then: ...
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<= vs < when proving big-o notation

We just started learning big-o in class. I understand the general concept that f(x) is big-o of g(x) if there exists two constants c,k such that for all x>k |f(x)|<=c|g(x)|. I had a question ...
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What are the asymptotic upper and lower bounds for T(n) = 2T(n/2) + n lg lg n?

The recurrence relation T(n) = 2T(n/2) + n lg lg n (where lg is logarithm to base 2) can be solved using the master theorem but I am not very sure about the answer. I have found my answer but am ...
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Measuring complexity for powering a number

I implemented a program for powering a number (a^n) using the divide and conquer technique. i implemented two versions of the same problem: Version 1: def input_params(): a=input('Input \'a\' ...
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Big-Oh, Concequence of a Definition

I have spent a lot of time reading questions and answers about Big-Oh on both here and math.stackexchange and seems that this is the best place for it as math.stackexchange don't seem to like ...
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In Asymptotic Analysis, Show That :- O( f(n) + g(n) ) = O( max{ f(n) , g(n) } ) [closed]

O represents Big-O. O(g) : { f| f is non negative function              there exists c,m where c and m are any constants ...
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Worst case vs O(n)

Is there a difference between statement "Worst case running time of an Algorithm A" and "Running time of an Algorithm A is O(n)"? What I think "there is no difference" because, worst case is the peak ...
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Throwing cats out of windows

Imagine you're in a tall building with a cat. The cat can survive a fall out of a low story window, but will die if thrown from a high floor. How can you figure out the longest drop that the cat can ...
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Fundamentals and maths required for algorithms

I have been working on RTOS and Linux driver development for quite some time. Now I am interviewing at semiconductor companies and failing to answer questions about algorithms on strings, and time ...
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Example of O(n!)?

What is an example (in code) of a O(n!) function? It should take appropriate number of operations to run in reference to n; that is, I'm asking about time complexity.