0
votes
1answer
32 views

What is the complexity of randomly selecting a non-null element from an array that has nulls?

Say I have an array where I want to randomly select elements from the array, but some of the array elements are null, like this: [0, 1, 3, null, 3, 2, null, 9, 12] If I select them at random (with ...
1
vote
4answers
59 views

Performance analysis of 3 sum

I have a method that finds 3 numbers in an array that add up to a desired number. code: public static void threeSum(int[] arr, int sum) { quicksort(arr, 0, arr.length - 1); for (int i = 0; i ...
23
votes
9answers
2k views

Algorithmic complexity of naive code for processing all consecutive subsequences of a list: n^2 or n^3?

I'm studying for a test and found this question: I can't really determine the complexity, I figured it's either O(n2) or O(n3) and I'm leaning towards O(n3). Can someone tell me what it is and why? ...
1
vote
2answers
30 views

Time complexity of the following function [closed]

I would like to estimate lowest i(in term of n) for which this condition fails. i! < n How can solve this problem?
0
votes
2answers
80 views

Is f(n) in Ω(g(n)), Θ(g(n)) or O(g(n))?

Given two functions in PHP, say function f($n) { return $n; } function g($n) { return pow($n, (2/3)); } How to check if a function f(n) is in Ω(g(n)), Θ(g(n)) or O(g(n)) in PHP? What I ...
2
votes
2answers
65 views

why E dominates v?

I analyzed the running time for Kruskal algorithm and I come up with O(ElogE+Elogv+v) I asked my prof and he said that if the graph is very sparse with many isolated vertices V dominates E which ...
1
vote
1answer
34 views

cannot find running time of findset in this algorithm

I designed an algorithm and I am trying to find the upperbound and lowerbound for that to be able to conclude theta: ms(G,w) for each v in G make-set(v) sort the edges of G.E into ...
3
votes
3answers
132 views

How is log(n!) = Ω( n*log(n))? [closed]

I know that log (n!) =log (1) + log(2) + .... log(n-1) + log(n) and n*log(n)= log(n) + log(n) + .... + log(n) or just adding log(n)'s n times. What constant can I multiply n*log(n) that ...
0
votes
1answer
49 views

Time complexity for the Polynomial Function?

Give an algorithm that evaluates an input polynomial an xn+an-1 xn-1+⋯+a1 x+a0 For a given value of x in time Ω(n2) and O(n). I tried to proof this but unable to find a suitable algorithm, can ...
1
vote
2answers
30 views

Lower-bound Runtime of this pseudo-code

for i = 0 to n do for j = n to 0 do for k = 1 to j-i do print (k) I'm wondering about the lower-bound runtime of the above code. In the notes I am reading it explains the lower bound runtime to be ...
0
votes
1answer
119 views

Finding complexity of recursive algorithm?

I'm having trouble with finding the complexity of recursive methods. I have an algorithm that sorts the elements of an array in ascending order. Basically what I did is write down each step in the ...
0
votes
2answers
137 views

Asymptotic Analysis questions

I found a couple questions on geeksforgeeks.org that i can't seem to understand(#1 and #3). I was hoping someone could clarify the answers for me: clarify whether true/valid or false 1.Time ...
0
votes
2answers
73 views

Which algorithm is better?

I have two algorithms. The complexity of the first one is somewhere between Ω(n^2*(logn)^2) and O(n^3). The complexity of the second is ω(n*log(logn)). I know that O(n^3) tells me ...
0
votes
1answer
107 views

Time complexity in Algorithms. Choosing Big-O and omega

So I have this assignment, where we're supposed to look through the following algorithm: Input: An array A storing n elements Output: An array B, where B[i] = A[0] + A[1] + ... + A[i]. for i = ...
2
votes
1answer
91 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 ...
0
votes
0answers
55 views

Could someone confirm some big-theta conceptions?

so this is a homework. I believe I've understood it, but it's hard to be sure, so I'd really appreciate if someone could confirm that I'm on the right track. Given the following code: void done(int ...
0
votes
1answer
1k views

Big Omega notation - what is f = Ω(g)?

I've been trying for the better part of an hour to find reference to the following: f = Ω(g) But I have had no luck at all. I need to answer a question for an assignment and I can't find ...
0
votes
1answer
144 views

How to determine the runtime of this function

I'm having some trouble with basic runtime understanding, maybe someone can clarify for me. How would I go about determining the runtime of this function? I need to determine rather f = O(g) or f = ...
1
vote
3answers
575 views

does every algorithm have Big Omega?

does every algorithm have Big Omega? Is it possible for algorithms to have both Big O and Big Omega (but not equal to each other- not Big Theta) ? For instance Quicksort's Big O - O(n log n) But ...
0
votes
1answer
638 views

why is a binary heap better as an array than a tree?

When making a binary max heap, why is it better to implement it as a array based, and not a tree based (tree based as in, each node also having a pointer to it's parent)? In terms of run time ...
2
votes
1answer
133 views

In asymptotic notation, given g(n), is the union of O(g(n)) and Ω(g(n)) the universal set U of all functions?

It seems yes. Any intuitive or serious proof is appreciated.
0
votes
1answer
318 views

using big-Omega to prove t(n) = n + n logn^2 is/= Omega(5n + 9nlogn^5)

I am having trouble solving a proof. Where t(n) <= c(5n + 9nlogn^5), 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 ...
1
vote
1answer
1k views

Running Time Calculation/Complexity of an Algorithm

I have to calculate the time complexity or theoretical running time of an algorithm (given the psuedocode), line by line as T(n). I've given it a try, but there are a couple things confusing me. For ...
1
vote
2answers
621 views

Algorithm Analysis (Big O and Big Omega)

I got this question wrong on an exam : Name a function that is neither O(n) nor Omega(n). After attempting to learn this stuff on my own through youtube, I'm thinking this may be a correct answer: ...
4
votes
2answers
325 views

How to add Big O and Big omega

If an algorithm has two sub algorithm, when it is best case for sub algorithm A1 to the given input, it is the worst case for sub algorithm A2. How could I find the overall algorithm complexity? ...
0
votes
1answer
582 views

please help to compare algorithm complexity between Big O , Theta and Omega

Good evening people, I would like some help to compare a Big O and a Theta algorithm. I can understand how to compare two big O's but something troubles my understanding on how to compare big O with ...
0
votes
1answer
797 views

Proving Polynomial Big-Theta through induction?

I understand the concept of big theta, big oh, and big omega.. I'm just having a hard time proving it. It's been a long time since I've done induction, so I'm pretty sure I'm just rusty and missing ...
-1
votes
1answer
143 views

proving n^k = Ω(c^n)

how can we prove n^k = Ω(c^n) i am trying to go by the definition n^k >= some constant * c^n but I am unable to get any value for the constant.I mean I am unable to approach the problem properly ...
3
votes
2answers
620 views

Growth functions of Algorithm?

Well i have two questions here:- If f(n) is function whose growth rate is to be found then, Is for all three notations will the g(n) be same, like for f(n)=O(g(n)) and similaraly for omega and theta ...
2
votes
2answers
3k views

Solving for Ω, and Θ (O, Omega and Theta notations)

I have solved a recurrence relation that has a running time of Θ(2^n), exponential time. How do I find Ω, and O for the same recurrence relation. I guess if it is Θ(2^n), it should also be O(2^n), ...
2
votes
4answers
309 views

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 ...
0
votes
1answer
421 views

Determining time complexity of for loops

I know that this loop is O(n^2) but what is Big-Omega and Big-Theta? How do you go about calculating them in situations like these? for(i = 0; i < array.length; i++) for (j = 0; j < ...
3
votes
2answers
909 views

Is log(n) = Ω(n)?

I believe it's not. The definition is that: log(n) >= c*n for some n = x, and all n > x The reason I think it's not is that the rate of growth of c*n = c. The rate of growth of log(n) = 1/n. ...
2
votes
2answers
468 views

Big-O notation 1/O(n) = Omega(n)

I have received the assignment to prove 1/O(n) = Ω(n) However, this would mean that n element of O(n) => 1/n element of Ω(n) which is clearly wrong. So my question is: Is the statement 1/O(n) = ...
1
vote
2answers
3k views

Big-O notation's definition

I really want to know real definition. I have tried to read a book but couldn't understood. O : Big-O notation worst case. Θ : Theta notation average case. Ω : Omega notation best case. Q1> But ...
3
votes
1answer
1k views

Function which is Big O(1) but not Ω(1)

Can some help me with a function which is Big O(1) but not Ω(1) and the other way around? Some explanation would greatly help.