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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Algorithm for generating all numbers that sum to a given number and its complexity

I found the following problem when preparing for an interview: 3 can be written as 1+1+1, 1+2, 2+1; 4 can be written as 1+1+1+1, 1+1+2, 2+2, 1+2+1, 2+1+1, 3+1, 1+3; Given an integer, how many ...
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738 views

Implement Dijkstra's Algorithm with a d-ary heap

As you can see in this link: http://en.wikipedia.org/wiki/D-ary_heap#Applications It says in Wikipedia that the optimal choice of d is d=m/n (it leads to a total time complexity of O(m logm/n n) ) It ...
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147 views

Number of addition and multiplication operators in this algorithm

Consider the following algorithm: i := 1 t := 0 while i ≤ n t := t + i i := 2i I'm interested in finding out how many addition and multiplication operations this algorithm ...
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82 views

Analyzing Running Time

def foo(x): if x > 5: return foo(x–1) – foo(x-1) else: return 77 def bar(a,b): if (b > 0): return bar( bar(a, b+1) , b-1 ) else: return 0 ...
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Assymptotic time complexity of this algorithm

I would like to know the time complexity of the following algorithm. At first glance the time complexity looks to be O(n^5) and that is what is mentioned in majority of the sites i have seen on the ...
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How to calculate O(n, x) for a given algorithms by examples? [closed]

I want to calculate the running time O(n, x) = Theta(n, x) for a given algorithm depending on n and x by a big amount (> 100) of examples (how long the algorithm will take for n and x). Is there ...
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1answer
82 views

asymptotic notation of constant input

If I have an algorithm,where the input is just a number and the output is its set of divisors.So my input will always be one number and the number of iterations in the algorithm will depend on how big ...
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3answers
156 views

Binary Tree arraly list represenation

I have been doing some research on Binary trees, and the array list representation. I am struggling to understand that the worst case space complexity is O(2^n). Specifically, the book states, the ...
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Time complexity, binary (search) tree

assume I have a complete binary tree up-to a certain depth d. What would the time complexity be to traverse (pre-order traversal) this tree. I am confused because I know that the amount of nodes in ...
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3answers
177 views

Sort then split a PHP array?

Here is a var_dump of my array: array(6) { [0]=> string(4) "quack" ["DOG"]=> string(4) "quack" [1]=> string(4) "quack" ["CAT"]=> string(4) "quack" [2]=> string(4) ...
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274 views

Find Closed End Formula for Recurrence equation by master theorem

Can we solve this T(n) = 2T( n/2 ) + n lg n recurrence equation master theorem I am coming from a link where he is stating that we can't apply here master theorem because it doesn't satisfied ...
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753 views

Big-O running time of various search algorithms [closed]

The method hasTwoTrueValues return true if at least two values in an array of boolean are true. Provide the Big-O running time for all three implementations proposed. // Version 1 public boolean ...
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1answer
397 views

Is this the right order of growth for big oh notation functions?

Is the right order of growth for the following functions: (From low to high) 4^log N, 2N, 3^100, log log N, 5N, N!, (log N)^2 This: 3^100 log log N 2N 5N (log N) ^2 4^log N N! I figured this out ...
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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? ...
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658 views

Complexity of a double for loop

I am trying to figure out the complexity of a for loop using Big O notation. I have done this before in my other classes, but this one is more rigorous than the others because it is on the actual ...
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1answer
279 views

Efficiency in Imperative programming and Functional programming [closed]

I have a question about the performance of IP and FP. Let's say I have a function to compute nth Fibonacci number. In imperative programming I have a choice to computing the nth Fibonacci number ...
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117 views

Iterative Combinations with Repetitons disregarding Order

I have the following problem. Given a set S of n elements, I need to generate all the possible combinations with repetitions disregarding order of sizes k=1,2,...,m. Example: n =3 S = {1,2,3} All ...
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2answers
282 views

Value of constants in Big Theta notation [closed]

In Big Theta notation, do the constants c1 and c2 differ for each value of n?. Definition: Theta(g(n)) = {f(n): there exist c1 >= 0, c2 > 0 and n0 > 0 such that for all ...
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52 views

What is the computational complexity of this function?

I was wondering what the computational complexity of this function would be? 2^(log(n)-1) the log is base 2.
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881 views

Worst Case Performance of Quicksort

I am trying to prove the following worst-case scenario for the Quicksort algorithm but am having some trouble. Initially, we have an array of size n, where n = ij. The idea is that at every ...
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2answers
1k views

Compare Big O Notation

In n-element array sorting processing takes; in X algorithm: 10-8n2 sec, in Y algoritm 10-6n log2n sec, in Z algoritm 10-5 sec. My question is how do i compare them. For example for y works ...
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Merge sort time complexity vs my algorithm. Big O

Here is an algorithm I am trying to analyse (see below). I do not understand why this has a O(n) time complexity when the merge sorts has O(n logn), they both seems to be doing the same thing. then ...
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Running Time Complexity vs. Space Complexity in sorting

I'm pretty new to algorithms and I have some questions. Let's say I have a sorting algorithm that sorts data at O(n^2), running time complexity. This could be selection sort for example. Now, let's ...
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176 views

Regarding complexity of an algorithm with steps C(n+r-1, r-1)

If an algorithm requires C(n+r-1, r-1) steps to solve a problem, where n is the number of input, and r is a constant, does the steps of algorithm consider exponential growth?
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259 views

What's the asymptotic complexity of this pseudocode?

could you plese tell me the asymptotic complexity of this code? f(n): if (n<=2) then return 1; else { if (n>950) then { i=n/2; return f(i);} else return f(n-2); } I have thought of ...
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395 views

Relationship between Asymptotic bounds and Running time?

Lets Take Binary search for instance, The best case running time would be obtained in First comparison when key_to_find == (imin + imax) / 2; And the best case running time would be represented ...
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442 views

Calculating work done by f x = (x,x)

Let's say I have this function: (Haskell syntax) f x = (x,x) What is the work (amount of calculation) performed by the function? At first I thought it was obviously constant, but what if the type ...
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Asymptotic runtimes of InsertionSort and FingerTreeSort

I've searched high and low in my book aswell as several sites on the internet, but I'm just not entirely sure about my answers. I need to give asymptotic runtimes of InsertionSort and FingerTreeSort ...
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485 views

time and space complexity

I have a doubt related with time and space complexity in following 2 case Blockquote Case I: Recurion: Factorial calculation. int fact(int n) { if(n==0) return 1; else ...
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1answer
675 views

Recurrence Relation T(n) = T(n^(1/2)) + T(n-n^(1/2)) + n

My friend and I have found this problem and we cannot figure out how to solve it. Its not trivial and standard substitution method does not really work(or we cannot apply it correctly) This should be ...
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Big Theta, Big O, Big Omega for a given function

Consider the function F: 2^(3*n) + n^2 Can the function A: 2^(3*n) be used as a Big Theta, Omega or O as a characterisation of F? Why? I'm revising the concepts of Big Omega, Big Theta and Big O and ...
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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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607 views

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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98 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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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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424 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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196 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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3answers
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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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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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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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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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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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301 views

Big O in an exponent

What in an exact formal manner does the expression f(n) = 2^O(n) mean?