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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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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Write the complexity class of a function [on hold]

Write the complexity class of a function that executes 10NLog2(N^2) + 20N + 5Log2(N) + 15 instruction in the worst case for a problem of size N. Simplify the result as much as possible.
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Subset sum algorithm: find all subsets that sum to a particular value, but

Given a set of numbers:{1,2,3,14,5,1,70,8,9,10} .) find the triplets, where the sum is smaller than a certain value N. .) the triplets should be a partition? (I do not want to change the order in the ...
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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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2answers
47 views

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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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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3answers
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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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How to write Pseudo codes having the following time complexities

I want to write pseudo code for this time complexity. ((n/2+100) ∑ i from 1025 to n i^2) + ( + (m/2500) log m/(6* log base 25 m)) Formula with Mathematical notations using wolframe alpha
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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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2answers
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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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1answer
75 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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2answers
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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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2answers
37 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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1answer
42 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
66 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
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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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1answer
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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
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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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1answer
44 views

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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1answer
74 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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1answer
70 views

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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1answer
28 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 ...
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Why O(2^log(n)) = O(n) and it is not a exponential run time?

Why is O(2^log(n)) equivalent to O(n)? Also why is this considered as an exponential run time and not a polynomial run time?
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1answer
130 views

Algorithm: Find smallest multiple

Let there be some positive integer Z and let there be a list of N, non-negative integers labeled z0 ... zn-1 What is an algorithm that can find the smallest multiple of Z that can be expressed in ...
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Finding roots in multiply rooted graphs

We deal with a directed graph which may contain or not cycles and may be or not be connected. We want to find the minimum set of vertex such that every other vertex in the graph is accessible from ...
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1answer
53 views

Is finding a subset with exact cut with other given subsets NP-hard?

I am trying to figure out whether the following problem is NP-hard: Given G_1,..,G_n subsets of {1..m} c_1,..,c_n non-negative integers in {0..m} Find T subset of {1..m} S.T. for all ...
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How to get Omega(n)

I have the formula a(n) = n * a(n-1) +1 ; a(0) = 0 How can i get the Omega, Theta or O Notation from this without the Master Theorem or did anyone have a good site to understand the explanation
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1answer
34 views

TIME COMPLEXITY OF BIG O's

Can anyone tell me step by step time complexity and total complexity of this piece of code: k = 0; for (i = 1; i < N; i = i * 3) for (j = 1; j <= i; j = j * 4) k++; I find its ...
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What is complexity measured against? (bits, number of elements, …)

I've read that the naive approach to testing primality has exponential complexity because you judge the algorithm by the size of its input. Mysteriously, people insist that when discussing primality ...
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Calculating the complexity of an algorithm with 3 loops

I tried to solve the following exercise : What is the order of growth of the worst case running time of the following code fragment as a function of N? int sum = 0; for (int i = 1; i <= N; i++) ...
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What is the time complexity of the following code?

/* * Program to group anagrams from the string array input */ import java.util.*; public class StringArrayAnagrams { //function to group the anagrams together public static void ...
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2answers
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BIG O In absence of enough information

So, lets say you have a function, X(N) that is a total black box. You don't know the growth rate of the function, you can't look it up, and you can't view the source (at the moment). Next lets ...
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1answer
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Big O for exponential complexity specific case

Let's an algorithm to find all paths between two nodes in a directed, acyclic, non-weighted graph, that may contain more than one edge between the same two vertices. (this DAG is just an example, ...
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Difference between time complexity and computational complexity [migrated]

For measuring the complexity of an algorithm, is it time complexity, or computational complexity? What is the difference between them? I used to calculate the maximum (worst) count of basic (most ...
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Complexity - determining the order of growth

I understand how to calculate a function's complexity for the most part. The same goes for determining the order of growth for a mathematical function. [I probably don't understand it as much as I ...
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4answers
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Binary search - worst/avg case

I'm finding it difficult to understand why/how the worst and average case for searching for a key in an array/list using binary search is O(log(n)). log(1,000,000) is only 6. log(1,000,000,000) is ...
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28 views

Time Complexity of a Top Down Merge Sort?

I understand that mergesort's time complexity is O(nLogn), however I am unable to arrive at this conclusion for its Top Down variant. TopDownMerge(A[], iBegin, iMiddle, iEnd, B[]) { i0 = iBegin, i1 = ...
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Why do we ignore co-efficients in Big O notation?

While searching for an answer of Big O Notation I have googled a lot and have also seen many SO answers like link 1, link 2, link 3 and many more, but still I have not clearly understood some points. ...
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maximum amount of numbers avoiding some of their combinations

I have a friend and he presented me this problem: (I dont know if it's his homework or not if that matters, anyway I don't ask for code or something) Algorithmically speaking, how can someone get the ...
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1answer
71 views

Searching for an element in log(n) time

I came across the following question: Suppose I modify a given sorted list of 4n distinct numbers as follows: Keep elements in even positions (positions 2, 4, 6, ... 4n) as they are. Form n ...
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If a NP solved in polynomial time, can Satisfiability solved in polynomial time

Based on the below link , I can know that solving of Satisfiability(NP Complete) in polynomial time means any other NP problem can be solved in polynomial time. But is Vice - Versa true? Also, If ...
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1answer
19 views

Complexity of Level Order traversal

Function to print a particular level void printGivenLevel(struct node* root, int level){ if(root == NULL) return; if(level == 1) printf("%d ", root->data); else if (level ...
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How is the given linear CFL NL-complete

I wanted to know how this language: L1={a^nb^n|n≥0} is NL-complete? I know that this language is in L, so therefore it is in NL too. But, how is it NL-hard?
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How to calculate the T(N) for this primes finder algorithm

This algorithm find all prime numbers below N var f = function(n){ var primes = [2]; //1 var flag; //1 for(var i=3; i<n; i+=2){ // ( from 3 to n-1 ) / 2 flag = true; //1 ...
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Determining the big-O runtimes of loop with inner loop repeat time is const

I have a function for(int i=0;i<n; i++) { b[i]=0; for(int j=0;j<5;j++) { b[i]=a[j+i] } } I need to calculate big-O of above function. My answers is: Inner loop run 5n time => ...
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Time Complexity of Dependent for loop

string str = "abcdefghijklmnopqrstuvwxyz"; int sum = 0; for(int i=0; i<str.length; i++) { int val = str[i]; while(val > 0) { sum = val % 62; val = val / 62; } } I ...
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Kolmogorov complexity is uncomputable using reductions

Can anyone please give me a proof of K-Complexity is unsolvable using reductions. eg: PCP(2) <= PCP(3) I can prove that PCP(3) is unsolvable by reducing to PCP(2) (by mapping every ...
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3answers
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Finding reachable vertices for every vertex in a directed graph

I know that brute force approach to do this is perform DFS on all the vertices of the graph.So for this algorithm the complexity would be O(V|V+E|). But is there more efficient way to do this?
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O notation proof for exponents and power

I am trying to prove that 4^n is not in the order of O(2^n). Is this a valid method ? 4^n >= c*2^n => 4^n/2^n >= c => 2^n >= c I got lost here...