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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Determining asymptotic complexity of program

Hey guys I'm fairly new to c++ and am trying to determine the asymptotic complexity of my program which takes in an input and determines if it's a polynomial or not. "If the length of the input ...
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How can the lower bound for matrix sorting be found?

Consider the problem of sorting an n x n matrix (i.e. the rows and columns are in ascending order). I want to find the lower and upper bound of this problem. I found that it is O(n^2 log n) by just ...
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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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1answer
29 views

Algorithmic Analysis of Insertion Sort case

I'm studying for an exam I have tomorrow and I can't seem to understand this problem. (This is an old assignment that I already have the answers to). I don't quite understand parts b and parts c. ...
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1answer
30 views

Big-Oh Complexity of Multi-Term Function

One of my homework problems has me deriving the Big-Oh complexity of the function: c^x + x(log(x))^2 + (10x)^c (where c is a constant > 1) I know that of these three terms, c^x grows the fastest, ...
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1answer
73 views

Asymptotic time complexity of recursive function (Theta)

I have been asked to analyze the asymptotic time complexity of the following recursion function: for-all k ≥ 1: T(n) = n + T(n/2) + T(n/4) + T(n/8) + .... + T(n/2^k) I was able to prove that: T(n) ...
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30 views

Theta vs. Omega

I'm trying to understand time complexity. If you have an algorithm with a running time of θ(n^2), is it possible to have a best case running time of Ω(n)? Or is the fastest running time only some ...
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1answer
86 views

Growth of log, squar and power functions using Asymptotic Notation

Arrange the functions according to growth rate using Asymptotic Notation. Can someone confirm whether the below listed sequence in ascending order is true or false ? n0.01, ...
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1answer
42 views

Convert name ordered list to grade ordered list

This is an interview question. Provide an optimal solution to achieve this: Input: List of student records, sorted by name. Output: List of student records, sorted by grade, then by name Grade can ...
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1answer
192 views

Complexity of dynamic hash table using AVL tree

What is the worst-case complexity of dynamic hash where instead of chain-hashing there will be an AVL tree in each array element of the table? If the hash-table wasn't dynamic, the WC complexity ...
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1answer
78 views

Why is an + b = O(n^2)?

I need to prove that an + b = O(n2) using the formal definition of big-O notation. I have searched several textbooks I own on discrete mathematics as well as several online sources for any examples or ...
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1answer
669 views

asymptotic-complexit - Calculate steps of primitive operations

I've some difficulties understanding how i should calculate the primitive operations of the following algorithm. I know that the calculations of the steps is somehow like this: (1) = 1 step: ...
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1answer
58 views

Asymptotic Run Time Analysis — Coin Change Algorithm

I need help finding the Asymptotic run time, i.e. Big O(n), of the following algorithm--> change_slow() . I've tried masters method and other techniques but can't seem to find the answer. This is a ...
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1answer
71 views

Time complexity in n bit array multiplication

Consider an array multiplier for multiplying two n bit numbers. If each gate in the circuit has a unit delay, the total delay of the multiplier is ? Θ(1) Θ(logn) Θ(n) Θ(n^2)
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1answer
40 views

Asymptotic complexity in its simplest form

I'm studying for my computer science exams and I've came across a few questions on simplifying asymptotic complexity and i'm unsure how far too take it. For example: Give '2n log(n) + 3 log(n)' in ...
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1answer
69 views

Big O, Theta, and big Omega notation

Based on my understanding, big O is essentially similar to theta notation but can include anything bigger than the given function (e.g. n^3 = O(n^4), n^3 = O(n^5), etc.), and big Omega includes ...
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1answer
45 views

Big O notation of an algorithm with a matrix as an input

So over the years, after working with algorithms I came across a question regarding the asymptotic behaviour of an algorithms. In mathematics, one could define Big-W(hatever) as "The asymptotic ...
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1answer
62 views

Some Increasing Growth Rate Function

in one of my note, instructor wrote the following function from increasing growth are sorted from left to right. but i couldn't understand it. i try to change it from image to text, but i ...
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1answer
160 views

Asymptotic analysis: Python Big-O homework

I have a homework question that asks me to give a tight big-o estimate of the worst-case time-complexity of the following Python code: sum = 0 i = n while i > 1: for k in range(n*n): ...
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1answer
250 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 ...
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1answer
41 views

Recurrence relations and asymptotic complexity

I am trying to understand the recurrence relation of f(n) = n^cos n and g(n) = n. I am told that this relation has no asymptotic behavior related to Big O, little o, Big Omega, little omega, or Theta. ...
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1answer
28 views

Complexity of Operation That Isn't Performed

If I want to describe the time complexity of an operation that isn't performed in some program, how could I do this? For example, given the following trivial function: def trivial(): return ...
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1answer
117 views

Asymptotic Notations-Big Oh Notation

What is the clear interpretation of this? O(1)+O(2)+O(3)+O(4)+O(5).......O(n) And how different is this from sigma O(i) 1<=i<=n? CLRS says it is different but does not explain ...
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1answer
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Asymptotic complexity between n! and n^n

What would be the example of a function f(n) that is asymptotically slower than O(n^n) and faster than O(n!), i.e. O(n!) < O(f(n))< O(n^n) ?
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1answer
43 views

building/inserting into sorted list

Here's the question at hand: You have a set of N random numbers to be inserted into a sorted List (smallest to largest). What would be the worst-case asymptotic time performance for building the ...
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1answer
220 views

Analyzing complexity for a code fragment

Let A be an array[1..n] which has zeros and ones in it.and func() be function whose complexity is theta(m).For the given pseudo code what would be the complexity? counter=0; for(i=0;i<n;i++) ...
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474 views

Karatsuba for multiplying m and n digit integer

I was trying to analyse karatsuba algorithm for multiplying an m and an n digit integer. As i understand, it will be most efficient if the integers are divided into m/2 and n/2 digit sub problems. The ...
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1answer
114 views

Instruction execution of a C++ code

Hello I have an algorthm in C++ and I want to find the instructions executed. The code is below cin >> n; for(i=1;i<=n;i++) for (j = 1; j <= n; j ++) A[i][j] = 0; ...
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175 views

Complexity proof

I would to prove the following example: n^k = O (c^n) for every k and c>1 It is noticeable that the polynomial function grows faster than exponential function. We try to find k0 > 0 satisfying ...
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28 views

What is the runtime complexity if T(n)= n*T(n-1)?

Should I use a tree to solve this ? Or is there an easiest way to solve it? I think it is n! right? Thank you.
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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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1answer
138 views

Time complexity of a recursive function

I have a Java function that receives a matrix (2-dimensional array[][]) and creates a dynamic array of options of changes for this array, and then recursively creates a dynamic array for each option ...
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1answer
117 views

What is the time-Complexity for the following code?

What is the time complexity for this code? In this code I am trying to solve the "Palindrome Partitioning" problem. I am using recursion. I am trying to understand DP. and through this program I ...
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Why is SortedDictionary<K, V>.GetEnumerator O(log n) but SortedSet<T>.GetEnumerator O(1)?

From the SortedSet<T>.GetEnumerator documentation: This method is an O(1) operation From the SortedDictionary<K, V>.GetEnumerator documentation: This method is an O(log n) ...
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Line by Line Analysis of Algorithm with Early Return Statement

I am attempting some homework for an algorithms class and I am running into a situation that is not described in the book. My task is to create an algorithm and perform a line by line analysis of ...
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What's the best algorithm give size N for knapsack?

I was wondering given a very small set of items, a medium and a very large what the best algorithms (Dynamic Programming, Greedy, Branch and Bound) are and their efficiencies. I am pretty sure If I ...
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Merge algorithm with arrays split in c>2 ways

As an example question we are asked to create a variant of merge sort where it splits array in to c>2 arrays of roughly equal size (when c = 2 it will use regular merge) This is the solution: ...
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Asymptotic Bounds: Upper and Lower

I have some examples for both Asymptotic Bounds: Upper and Lower and I can't understand why we are considering the dominant terms or the n terms in each of them. Can someone please explain them to me? ...
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Homework: Prove or disprove: (5n)!=O(n!^5)

I have this question in my h.w: Prove or disprove: (5n)!=O(n!^5). I don't know how to approach this (of course I know the O notation definition but I don't have a clue how to solve it).. any help ...
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Depth first search and proving valid bounds

(Question) The runtime of dfs on a graph G = ( V, E ) is Θ( | V | + | E | ) This question asks you to show formally that in some sense this is the best possible runtime we can hope for, for general ...
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how to prove asymptotic proposals

I want to prove the follow proposal if f(n)=o(g(n)) then f(n)=O(g(n)). I think to start with the limit of small o: lim(f(n) / g(n)) = 0 And after to tell that limit of Big O: lim(f(n) / ...
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What is the difference between O(x+y) and O(x*y)? What do either of them mean?

As far as I understand O(x+y) = O(bigger of the two). Am I right? What about O(x*y). I was reading the mapreduce paper and it said the master must make O(M + R) scheduling decisions and keeps O(M R) ...
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Why Does Constants Big-O Rule Apply Only To Positive, Monotonic, and Non-decreasing Functions Always?

I know that for positive monotonically non-decreasing functions, f(n) and g(n), f(n) = O(g(n) + c) entails f(n) = O(g(n)) Why does this always true only for positive monotonically non-decreasing ...
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Recurrence relation for this recursive algorithm

I have been asked to find the recurrence function and then determine the asymptotic complexity. I will use the substitution method. A is array[1..n] `>MIN(left, right) is: if left==right ...
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55 views

Priority Queue algorithm complexity

The inputs are x sorted lists (in increasing order) and in each list there are j/x elements (we are assured the numbers will work out to be a natural number. eg: j = 9, x = 3 L1 = [1, 2, 5], L2 = [5, ...
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Using Theta Notation Find Worst Case

I was assigned to find the worst case runtime of this algorithm using theta notation. As this is a new, complicated concept to me I am slightly confused. The equation is below for i->0 to n do ...
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Confused about Big-O notation

I am new to Big-O notation. While reading I came across an example : Qus : Find upper bound for f(n) = n^2 + 1 Sol : n^2 + 1 <= 2n^2 for all n >= 1 so f(n) = O(n^2) with c = 2 and n0 = 1 ...
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Ways to search all diagonals of a 2D M x M Array C#

I've started writing a piece of code to help me search for an object in all the objects found in the diagonals of an M x M 2D array. Though the code works, I'd like to know if there is a way I can ...
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Placing a lower bound on the number of full binary trees with n nodes

Before I begin, this is a homework problem, from a 2010 course I'm self studying for. The problem says to show by induction that the number of possible full binary trees with n nodes (denoted B_n) is ...
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Finding a language that is at least decidable in exponential time

I'm currently trying to think of a problem/language that can be decided/solved in at least m^n steps where n is the size of the input and m is some integer greater than 1 (exponential running time). ...