0
votes
2answers
68 views

Why O(logm + logn) and not O(logm * logn) [on hold]

I saw the same question 3 times on Stack Overflow: Complexity of an algorithm Time complexity for two pieces of code Tricky Big-O complexity I wanted to ask the question in one of them but I couldn't ...
-1
votes
1answer
40 views

Puzzle jump game Complexity

My questions is specific to the problem posed here: Interview puzzle: Jump Game The top answer claims that it runs in O(n) time. It says that it can do this because each element need be ...
0
votes
1answer
24 views

Space/Time complexity of Binary Tree Equality

I had an interview yesterday that involved a pretty basic tree data structure: t ::= int | (t * t) where a tTree is either an integer (leaf) or two t's which represent left and right subtrees. This ...
-4
votes
0answers
36 views

Find algorithms to calculate 2^n-1in given complexity [on hold]

I need to find several algorithms to calculate 2^n -1. For example, I need one to that is in Theta(n^n) and one in Theta(1). I am counting 1 arithmetic operation as 1 added "complexity unit". How ...
1
vote
1answer
92 views

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 ...
0
votes
2answers
42 views

Big Oh Notation and Big Theta Notation Simplifying

I have a homework question that asked us to show that 2n+5 is O(n^2). This is what I did to try and solve it: I chose that k = 1 and assumed that n > 1 so then f(n)/g(n) = (2n+5)/n^2 < ...
0
votes
1answer
27 views

simulation theory - how is the sorting only log(p)?

In the proof of simulation theory : simulating concurrent write : "a p-processors in a crcw algorithm can be no more then log(p)time faster then the best erew algorithm for the same problem" can ...
2
votes
1answer
44 views

complexity of a Sequential algorithm - min suffixes

In a Sequential algorithm (not parallel).. is the best complexity for finding the min in each suffix of an array would be O(nlogn) ?could it be O(n)? if not? why? INPUT: array={x1,x2....xn} OUTPUT: ...
0
votes
2answers
64 views

Solving Recurrence Relation via Recursion Trees of the Form “T(n-1)”

I understand that the Master Theorem and recursion tree can be used for "divide-and-conquer" recurrence relations (i.e. T(n)=T(n/2)+1). However, how would I apply those concepts to T(n)=T(n-1)+logn? ...
-6
votes
2answers
66 views

what is the answer for : n! = Θ( )?

How do I find the answer? Even Big O is enough. All clues i found are complex math ideas. any help? What would be the correct approach to tackle this problem? recursion tree seems too much of a work ...
3
votes
3answers
232 views

Can i check if subsequence faster then O(n*n)

So my question is in topic's name. Does exists an algorithm that checks if B is subsequence of A faster, than O(N^2), for example O(NlogN) or simply O(N)? Only way found is simple brut-force ...
2
votes
3answers
124 views

Calculating the Recurrence Relation T(n)=T(n-1)+logn

We are to solve the recurrence relation through repeating substitution: T(n)=T(n-1)+logn I started the substitution and got the following. T(n)=T(n-2)+log(n)+log(n-1) By logarithm product rule, ...
0
votes
3answers
43 views

Running time of a recursive function with two inputs

I've been solving some interview questions, practicing and I am still struggling a bit to determine the running time of some recursive functions. The question I was solving is: Imagine a robot ...
0
votes
1answer
42 views

How to find constants c1, c2 and n0 in a theta proof?

Assume that I want to find out if a function is part of theta group n^3. After some algebraic steps I manage to get the following function: c1 <= 4 / n - 4/n^2.5 + 4/n^4 <= c2 At that step I ...
0
votes
3answers
91 views

is the memory complexity here is O(1) or O(N)?

The following method finds the longest contiguous sequence of integers in an unsorted array. ({1,3,2,4,6,5} will return 6): public static int what(int[] vec) { int m = 0; for (int i = 0; i ...
3
votes
1answer
128 views

Ternary search is worse than binary search?

People usually ask the opposite of this question (Is ternary search is better than binary search?). I really think it's worse (not in terms of both run at complexity of O(log n)). I'm really not ...
0
votes
1answer
119 views

Analyzing an exponential recursive function

I am trying to calculate the complexity of the following exponential recursive function. The isMember() and isNotComputed() functions reduce the number of recursive calls. The output of this code is ...
-6
votes
3answers
133 views

Big O operation (attempted answer provided) [closed]

Describe any operation that takes O(1) time. The above is pretty much the question (not technically i know) but it's what i've been asked to do. My answer is the following: An O(1) operation ...
0
votes
0answers
74 views

Better Algorithm, Better Complexity [duplicate]

You are given an unsorted array of n integers, and you would like to find if there are any duplicates in the array (i.e. any integer appearing more than once). The complexity that i've found O (N^2) = ...
0
votes
4answers
43 views

Complexity of O(M+N)

I've computed complexity of below algorithm as for i = 0 to m for j = 0 to n //Process of O(1) Complexity: O( m * n) This is simple example of O( m * n). But I'm not able to figure ...
2
votes
4answers
76 views

Time complexity modified bubblesort

Have this java code for bubblesort: public void sort() { for(int i = 1; i < getElementCount() ; ++i) { for(int j = getElementCount()-1; j >= i; j--) { if (cmp(j,j-1) ...
0
votes
1answer
87 views

Recurrence Relation based off Pseudo Code (Time complexity)

Consider the element uniqueness problem, in which we are given a range, i, i + 1, . . . , j, of indices for an array, A, and we want to determine if the elements of this range, A[i], A[i+1], . . . , ...
11
votes
3answers
181 views

How can I print integer in triangle form

I want to print integer in triangle form which look like this 1 121 12321 I tried this but I do not get the actual result for($i=1;$i<=3;$i++) { for($j=3;$j>=$i;$j--) { ...
2
votes
2answers
77 views

How to solve the recursive complexity T(n) = T(n/4)+T(3n/4)+cn

I am solving this recurrence using a recursion tree. The total cost of each level is n, and the depth of the tree is between log (n) base 4 and log (n) base 4/3. Intuitively, I expect the solution to ...
1
vote
0answers
32 views

NP-hard vs. NP vs. co-NP [closed]

I have a question related to the NP, co-NP, and NP-hard. If given a problem Q in co-NP, and knowing that Q is NP-hard, does it implies that NP = co-NP? If yes, how do I prove it?
1
vote
2answers
74 views

NP-Complete with polynomial reducibility [closed]

A, B, C are all decision problems, and (1) A is polynomial time reducible to B, (2) B is polynomial time reducible to C. If both A and C are NP-Complete, then B is also NP-Complete? I know that if A ...
-1
votes
2answers
70 views

Need help finding the complexity of this algorithm

Hi I need help finding the complexity of this algorithm. Could you please answer the complexity line by line not just the final result? The algorithm is the following one: int algorithm(int x) { ...
0
votes
1answer
59 views

How is the cost of suffix array generation O(n^2 log n)?

To build a suffis array on a string of n characters, we first generate the n suffixes O(n) and then sort them O(n log n) the total time complexity apprears to be O(n) + O(nlogn) = O(nlogn). But I ...
1
vote
0answers
42 views

Is there a value to randomized slightly better complexity-wise algorithms? [closed]

A little bit of philosophical thread here. Let's say there is a problem P which is believed to be unsolvable in o(f(n)) complexity (for some f(n) which it was already solved in). Now, Someone will ...
0
votes
1answer
60 views

Optimization of movement on board

Suppose you have a n x n gaming board and you have a character that can move like a knight on a chess board except he can't move up or left. And each block he moves to has a value which can be ...
127
votes
5answers
6k views

Are 2^n and n*2^n in the same time complexity?

Resources I've found on time complexity are unclear about when it is okay to ignore terms in a time complexity equation, specifically with non-polynomial examples. It's clear to me that given ...
5
votes
5answers
132 views

search for multiple strings

I know of efficient ways to look for one string in a file (kmp), or various strings in a file (trie) But, for years now, I've been wondering if there is a way (and ocasionally thinking it impossible) ...
1
vote
3answers
37 views

Can I use Big-O notation to compare performance of optimised and unoptimised implementation of same algorithm?

I'm writing about an optimisation about an algorithm which has O(n) complexity. It still has O(n) complexity but the execution time has improved tremendously. Is it correct for me to say that I've ...
0
votes
0answers
38 views

Lower bound for parallel prefix (scan) on EREW PRAM model

I'm trying to find the proof (preferably an academic publication that I can cite) that shows parallel prefix (scan) has a lower bound of O(n/p + log p) on an EREW PRAM model. I'm aware of the Cole ...
4
votes
4answers
134 views

Algorithm (or pointer to literature) sought for string processing challenge

A group of amusing students write essays exclusively by plagiarising portions of the complete works of WIlliam Shakespere. At one end of the scale, an essay might exclusively consist a verbatim copy ...
0
votes
0answers
40 views

RB-Tree: search execution time

I must implement an interval tree using RB-trees for an "algorithm and data structures" class project, so it was asked to plot insertion and search T(n). I know that this function must be ...
1
vote
2answers
53 views

Difficulty showing run-time is bigOmega(g(n))

I'm having some trouble with the following algorithm: for (int i = 1; i < n; i = 2i) for (int j = i; j < n; j++) // do something (const time) So it wasn't too hard showing that ...
2
votes
1answer
38 views

Combined complexity of phases of external sort

External sort complexity has been well described here. On page 2 and 3, it well describes the phase1 and phase2. I understand complexities described in each step. My question is on the line Summing ...
0
votes
4answers
68 views

Analyzing best-case run time of copy algorithm

I'm at a loss as to how to calculate the best case run time - omega f(n) - for this algorithm. In particular, I don't understand how there could be a "best case" - this seems like a very ...
0
votes
1answer
126 views

Log-log plot/graph of algorithm time complexity [closed]

I just wrote the quick and merge sort algorithms and I want to make a log-log plot of their run time vs size of array to sort. As I have never done this my question is does it matter if I choose ...
1
vote
1answer
286 views

Time complexity analysis. while loop with inner for loop [duplicate]

I'm trying to find the number of times this code runs. On the right I have my attempt at the code. I'm am not sure about the loops. Here is the code: times sum = 0 ...
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
3answers
1k views

How to reduce the time complexity to calculate number of bounded Slices to O(N)?

An integer K and a non-empty zero-indexed array A consisting of N integers are given. A pair of integers (P, Q), such that 0 ≤ P ≤ Q < N, is called a slice of array A. A bounded_slice is a slice ...
0
votes
1answer
65 views

Calculating algorithm complexity using Big O

I am trying to calculate the complexity of different variations of an algorithm using Big O. A simplified description of the algorithm follows: Let's consider a "converter" a function that takes ...
0
votes
3answers
41 views

finding complexity in an if clause

assume that I have an if clause if (!f(x)) { g(x); } the complexity of f(x) = O(x^3) and complexity of g(x) = O(x^2). In this case what is the overall complexity ? O(x^5) ? or O(x^3) ? I ...
4
votes
3answers
150 views

How many times the function will be invoked?

Here i have the loop: for (i = n; i < 2*n; i += 4) { for (j = 0; j < 3*i; j += 2) { function(); } } How can i count amount of calls (in a term of n) of function() without ...
0
votes
2answers
37 views

(double) link list get() complexity

Why in double link list complexity of get(index) is equal O(n) not O(1)? Why it isn't like in array O(1) ? Is it because we have to traverse through previous nodes to get one ?
0
votes
5answers
66 views

How many times the function will be invoked?

I have this cycle: for(i = 0; i < n; i ++) { if(i % 5 == 1 && i % 3 == 1) { function(); } } How can i count amount of calls of function() without running this code?
4
votes
1answer
192 views

Average time complexity of finding top-k elements

Consider the task of finding the top-k elements in a set of N independent and identically distributed floating point values. By using a priority queue / heap, we can iterate once over all N elements ...
-3
votes
1answer
68 views

what is polynomial and exponential time?

I am trying to understand what polynomial and exponential time is in relation to the big O notation. I understand the basics of O notation such as linear is O(n) and O(n^2) is quadratic etc. The ...