Computational complexity theory is a branch of the theory of computation in theoretical computer science and mathematics that focuses on classifying computational problems according to their inherent difficulty. Particularly common in programming is *amortized analysis* for time or space

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Complexity of these nested loops? [duplicate]

Could somebody explain me what the O() is of the following loop: for(int i = 1; i <= n; i *= 2) for(int j = 0; j < i; j++) sum++ I asked a few people and everyone had different ...
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Algorithm complexity: if/else under for loop

I am wondering if in a situation like the following (an if/else statement under a for loop) the complexity would be O(n) or O(n^2): for character in string: if character==something: do ...
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23 views

Big-O and Function Domination

I am currently working on some problems from my textbook, about Big-O notation, and how functions can dominate each other. These are the functions that I am looking at from my book. n² n² + 1000n ...
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PSPACE-complete language

We know that QBF (quantified boolean formula) is PSPACE-complete. Now, I have a question while reading a research paper. Let L is in (((\sigma)^p)_2)^{QBF} then L is PSPACE-complete.
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What is an Approximation Factor?

How is an approximation Factor different than time-complexity? I have heard, for example, of polynomial algorithms with exponential factors, what does that mean? Does that mean it is not technically ...
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24 views

Complexity ford fulkerson algorithm

Evening to everybody. I got some problem to understand how to compute ford fulkerson algorithm complexity. In particular, under integer constraint for capacities, some text tells that is O(N x M x ...
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1answer
23 views

Ways to measure bit sequence complexity

I'm looking for a simple way to estimate the complexity of a sequence of bits of a fixed size (probably a maximum of length 10). For example, I imagine 0000000 and 111111 aren't very complex at all, ...
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24 views

Using Master theorem to calculate asymptotic time complexity of algorithm

Problem: You have an algorithm that divides n size problem to six subproblems with size of one quarter of the original. For dividing the algorithm makes 100 steps and for merging 75n. What's the time ...
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58 views

What is the complexity of this piece of code

I had to determinate big O complexity of this piece of code. I thought the answer is nlogn but apparently its n. Can anyone help explain why that is so? void funct(int n) { for (int i = n; i > ...
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32 views

Complexity of this greedy algorithm to find the maximum independent set of a graph

What is the complexity for this method which finds the maximum independent set of a graph? I think it's O(|E|), is that right? Greedy(G): S = {} While G is not empty: Let v be a node with minimum ...
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Calculating the Recurrence Relation T(n)=T(n / log n) + Θ(1)

The question comes from Introduction to Algorithms 3rd Edition, P63, Problem 3-6, where it's introduced as Iterated functions. I rewrite it as follows: int T(int n){ for(int count = 0; n > 2 ; ...
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26 views

Most efficient way to print differences of two arrays?

Recently, a colleague of mine asked me how he could test the equalness of two arrays. He had two sources of Address and wanted to assert that both sources contained exactly the same elements, although ...
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How can I tell how many times these nested statements will execute?

I have the following pseudocode: SelectionSort(A) n = A.length for j=1 to n-1 smallest = j for i=(j+1) to n if A[i] < A[smallest] smallest = i ...
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31 views

Determinating Complexity time

I'm doing a project for university about how to determinate Complexity assuming that all that is known about an algorithm are their running times depending on the data size. The types of algorithm I ...
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1answer
91 views

Sorting complexity

Given an array where values in the even indices are in incremental and values that in odd indices are in decremental order. For example: [1,99,16,65,45,23,97] I have thought about two different ...
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Finding complexities of space and time using recursion

first function:- void strange (int n,int k) { int i; if(k > n) return; for(i=k; i<n; i++) printf("?"); strange(n, k+2); return; } second function:- void weird(int n, int k) { int ...
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Calculating complexities of both time and space

int foo2(int k) //function defining { int x=0; // O(1) while(n>0) // O(log(n)) { int i; // another O(log(n)) because its inside the loop for(i=0;i<n;i++) // ...
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27 views

A little help finding the complexity of time and and complexity of space

int f2(int n) { int x, y, z = 0, i; for(x = n, i = 0; i < n; i ++, x *= n) { y = x; while (y > 1) { y /= 3; z += y; } ...
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wwhat is the time complexity of in-buit function index() in python lists?

I want to know what happens if I have a sorted list and a random list how much time index() inbuilt function takes to return the index of a searched value in python.
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Probability mass of summing two discrete random variables, in linearithmic time

Given two discrete random variables, their (arbitrary) probability mass functions a and b and a natural-number N such that both of the variables have the domain [0..N] (therefore the functions can ...
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28 views

Exponential growth doubling processor speed

According to Wikipedia article on Exponential growth E.g. if a slow processor can solve problems of size x in time t, then a processor twice as fast could only solve problems of size x+constant in ...
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Why is only one of the given statements about complexity classes correct? [closed]

Apparently the correct answer to the following question is (C), but why are the other options not correct until we know the value of n? If n=1, all of these seem correct except (B)! Where am I going ...
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what is the time complexity of finding k successors in red black tree?

Given a pointer to a node in a red black tree, what is the time complexity of finding all k successors of that node? The easy bounds are O(klgn) & O(n). Is there a tighter bound? I feel it is ...
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29 views

Binary search tree intersection

I have 2 binary search trees T1 and T2 with same number of nodes n >= 1. For each node P we have LEFT(P) and RIGHT(P) for links between nodes and KEY(P) for value off the node. The root of T1 is R1 ...
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Bucket sort:Why don't we set range to 1? vs counting sort

Bucket sort creates k buckets....and distribute n numbers in one of those buckets.. Eg.1-10, 11-20, 21-30... O(n+k) The no.s within the bucket are sorted using insertion O(n²) It works fine when ...
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How can I find the complexity of this code segment?

Here's the pseudocode of the code segment I'm talking about, temp = 1 repeat for i = 1 to n temp = temp+1; n = n/2; until n<=1 I know the outer loop (repeat) executes n times. What ...
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51 views

Reverse a substring from a string

I am looking for better algorithm to solve a problem. Problem: Check a given string if given substring is present and reverse all the substrings in the given string. Example: String: Can you ...
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1answer
30 views

Compute size N that can be solved in certain amount of time

I am working on an exercise (note no homework question) where a number of steps that can be exercised by a computer are given and one is asked to compute N in relation to certain time intervals for ...
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42 views

What is the worst case complexity of the given program?

program takes as input a balanced binary search tree with n leaf nodes and computes the value of a function g(x) for each node x. If the cost of computing g(x) is min{no. of leaf-nodes in left-subtree ...
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What is the computational complexity of the bottleneck matching in general graph when using in an iterative manner?

my work involves solving a bottleneck matching (nonbipartite/general graph) in the wireless network and I am using the algorithm proposed in [1].  I consider number of vertices N of the graph as even ...
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119 views

Would this algorithm run in O(n)?

Note: This is problem 4.3 from Cracking the Coding Interview 5th Edition Problem:Given a sorted(increasing order) array, write an algorithm to create a binary search tree with minimal height Here is ...
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Find the path with the biggest value using depth-first-search

I'm having some trouble resolving a problem that I believe needs the use of depth-first-search algorithm. This problems involves trying to find the biggest value of the path, but every time you walk ...
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Analyzing time complexity using recurrence relations

Complexity analysis noob here. I'm trying to figure out the time complexity of a recursive algorithm using the given recurrence relation below - T(n) = n + 4T(n/2) There are three methods for ...
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212 views

3SAT solved in polynomial time?

I have seen few errors in the cnf files for both satisfiable and unsatisfiable clauses files SATLIB Benchmark Problems To be more specific I have found out that the 1st file of the zip folder here: ...
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92 views

Computational Complexity of Higher Order Functions?

Map and filter seem like they would be linear O(n) because they only have to traverse a list once, but is their complexity affected by the function being passed? For example are the two examples below ...
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Finding the complexity of a function

I am trying to calculate the time complexity of the next function, max_list11, which finds a maximum of a list recursively: def max11(L,left,right): if left==right: return L[left] ...
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time complexity of relation T(n) = T(n-1) + T(n/2) + n

for the relation T(n) = T(n-1) + T(n/2) + n can I first solve the term (T(n-1) + n) which gives O(n^2), then solve the term T(n/2) + O(n^2) ? according to the master theorem which also gives ...
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87 views

Big O notation for the complexity function of the fourth root of n

I am expected to find the Big O notation for the following complexity function: f(n) = n^(1/4). I have come up with a few possible answers. The more accurate answer would seem to be O(n^1/4). ...
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How many times is x=x+1 executed in theta notation in terms of n?

I'm taking Data Analysis and Algorithms in the Summer. The question: Find a Θ-notation in terms of n for the number of times the statement x = x + 1 is executed. for i = 1 to 526 for j = 1 to ...
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What is the time complexity of the given algorthm?

x=0 for i=1 to ceiling(log(n)) for j=1 to i for k=1 to 10 x=x+1 I've included the answer I've come up with here: I think the time complexity is θ(n^2 log(n)), but I am not ...
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41 views

time complexity of non-inplace binary search

Assuming that binary search is called upon a subarray of approximately length n/2 and that there are at most three comparions at a level I came up with T(n) = T(n/2) + 3 as a recurrence relation. ...
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48 views

Time complexity of a function?

What are the steps I need to take to work out the time complexity of this function in terms of N? Or any function? I'm essentially asking how to evaluate algorithm complexity in Big O notation? int ...
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3answers
72 views

Simple Algorithm complexity

I have an algorithm and I need help finding the complexity of it (tightest possible upper bound) for(int i = 0; i < n/2; i++) for(int j = 0; j < n/4; j++) for(int k = 0; k < n; ...
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2answers
40 views

complexity of simple algorithm

I have the following algorithm but I dont know its' complexity. Could someone help me? Input size is n. int x = n; while (x > 0) { System.out.println("Value is" + x); x = x/5; } Thanks a ...
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Complexity classes examples

I wanted to know if my answers are indeed correct for the following statements: 3(n^3) + 5(n^2) + 25n + 10 = BigOmega(n^3) -> T ->Grows at a rate equals or slower 3(n^3) + 5(n^2) + 25n + 10 = ...
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1answer
35 views

Efficiently building a thresholded similarity graph

A thresholded similarity graph is a set of nodes and edges, where nodes are connected by an edge iff the similarity between the two nodes is higher than a given threshold. Building such graph of n ...
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Why does liblzma fail to compress any random string?

I'm using the ruby binding, ruby-xz. random_string = SecureRandom.random_bytes(100) compressed_string = XZ.compress(random_string, compression_level = 9, check = :none, extreme = true) ...
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77 views

how can two algorithms one with O(n^2) the other Ω(n) has about the same run time?

How can two algorithms one with O(n²) the other with Ω(n) have the same practical run time, when testing the algorithms with a large number?
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How can I reason about big O for various functions?

Consider the following functions: f(n) = 2^n g(n) = n! h(n) = n^logn Which of the following statements about the asymptotic behavior of f(n), g(n), and h(n) is true? (A) f(n) = O(g(n)); g(n) ...
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29 views

Recursive algorithm complexity with for loop

I have a recursive algorithm like: void bishopSolver(int level, int i, int board[][N]){ int size = 63 - (6 - level); for (; i < size; i+=2){ addToMap(level, i); if(level ...