# Tagged Questions

The Big-O notation is used to represent asymptotic upper bounds. It describes relevant time or space complexity of algorithms. Big-O analysis provides a coarse and simplified estimate of a problem difficulty.

260k views

### Plain English explanation of Big O

What is a plain English explanation of Big O? With as little formal definition as possible and simple mathematics.
116k views

### Big O, how do you calculate/approximate it?

Most people with a degree in CS will certainly know what Big O stands for. It helps us to measure how (in)efficient an algorithm really is and if you know in what category the problem you are trying ...
60k views

### Computational complexity of Fibonacci Sequence

I understand Big-O notation, but I don't know how to calculate it for many functions. In particular, I've been trying to figure out the computational complexity of the naive version of the Fibonacci ...
82k views

### How to find the kth largest element in an unsorted array of length n in O(n)?

I believe there's a way to find the kth largest element in an unsorted array of length n in O(n). Or perhaps it's "expected" O(n) or something. How can we do this?
20k views

### Big-O for Eight Year Olds?

I'm asking more about what this means to my code. I understand the concepts mathematically, I just have a hard time wrapping my head around what they mean conceptually. For example, if one were to ...
23k views

### What are the Complexity guarantees of the standard containers?

Apparently ;-) the standard containers provide some form of guarantees. What type of guarantees and what exactly are the differences between the different types of container? Working from the SGI ...
20k views

### Constant Amortized Time

What is meant by "Constant Amortized Time" when talking about time complexity of an algorithm?
15k views

### List of Big-O for PHP functions

After using PHP for a while now, I've noticed that not all PHP built in functions as fast as expected. Consider the below two possible implementations of a function that finds if a number is prime ...
27k views

### What is the difference between Θ(n) and O(n)?

Sometimes I see Θ(n) with the strange Θ symbol with something in the middle of it, and sometimes just O(n). Is it just laziness of typing because nobody knows how to type this symbol, or does it mean ...
175k views

### What does O(log n) mean exactly?

I am currently learning about Big O Notation running times and amortized times. I understand the notion of O(n) linear time, meaning that the size of the input affects the growth of the algorithm ...
6k views

### Implement a queue in which push_rear(), pop_front() and get_min() are all constant time operations

I came across this question: Implement a queue in which push_rear(), pop_front() and get_min() are all constant time operations. I initially thought of using a min-heap data structure which has O(1) ...
13k views

### Are there any O(1/n) algorithms?

Are there any O(1/n) algorithms? Or anything else which is less than O(1)?
29k views

### Is a Java hashmap really O(1)?

I've seen some interesting claims on SO re Java hashmaps and their O(1) lookup time. Can someone explain why this is so? Unless these hashmaps are vastly different from any of the hashing algorithms I ...
11k views

### What is Big O notation? Do you use it? [duplicate]

What is Big O notation? Do you use it? I missed this university class I guess :D Does anyone use it and give some real life examples of where they used it? See also: Big-O for Eight Year Olds? ...
15k views

### Algorithm to determine if array contains n…n+m?

I saw this question on Reddit, and there were no positive solutions presented, and I thought it would be a perfect question to ask here. This was in a thread about interview questions: Write a ...
7k views

### Stack with find-min/find-max more efficient than O(n)?

I am interested in creating a Java data structure similar to a stack that supports the following operations as efficiently as possible: Push, which adds a new element atop the stack, Pop, which ...
29k views

### Big-O summary for Java Collections Framework implementations?

I may be teaching a "Java crash-course" soon. While it is probably safe to assume that the audience members will know Big-O notation, it is probably not safe to assume that they will know what the ...
17k views

### multiset, map and hash map complexity

Hallo everybody, I would like to know the complexity in Big O notation of the STL multiset, map and hash map classes when: inserting entries accessing entries retrieving entries comparing entries
36k views

### How to merge two sorted arrays into a sorted array?

This was asked of me in an interview and this is the solution i provided: public static int[] merge(int[] a, int[] b) { int[] answer = new int[a.length + b.length]; int i = 0, j = 0, k = 0; ...
4k views

### What are the rules for the “Ω(n log n) barrier” for sorting algorithms?

I wrote a simple program that sorts in O(n). It is highly memory inefficient, but that's not the point. It uses the principle behind a HashMap for sorting: public class NLogNBreak { public ...
12k views

### Big Theta Notation - what exactly does big Theta represent?

I'm really confused about the differences between big O, big Omega, and big Theta notation. I understand that big O is the upper bound and big Omega is the lower bound, but what exactly does big Theta ...
3k views

### What is the complexity of regular expression?

What is the complexity with respect to the string length that takes to perform a regular expression comparison on a string?
11k views

### O(nlogn) Algorithm - Find three evenly spaced ones within binary string

I had this question on an Algorithms test yesterday, and I can't figure out the answer. It is driving me absolutely crazy, because it was worth about 40 points. I figure that most of the class ...
1k views

### A data structure supporting O(1) random access and worst-case O(1) append?

I realize a resizable indexed collection that uses an array to store its elements (like List<T> in .NET or ArrayList in Java) has amortized O(1) insertion time at the end of the collection. But ...
7k views

### Is list::size() really O(n)?

Recently, I noticed some people mentioning that std::list::size() has a linear complexity. According to some sources, this is in fact implementation dependent as the standard doesn't say what the ...
27k views

### Time complexity of Hash table

I am confused about the time complexity of hash table many articles state that they are "amortized O(1)" not true order O(1) what does this mean in real applications. What is the average time ...
8k views

### What is the Big-O of a nested loop, where number of iterations in the inner loop is determined by the current iteration of the outer loop?

What is the Big-O time complexity of the following nested loops: for(int i = 0; i < N; i ++) { for(int j = i + 1; j < N; j++) { System.out.println("i = " + i + " j = " + j); ...
3k views

### Asymptotic complexity of .NET collection classes

Are there any resources about the asymptotic complexity (big-O and the rest) of methods of .NET collection classes (Dictionary<K,V>, List<T> etc...)? I know that the C5 library's ...
27k views

### Is log(n!) = Θ(n·log(n))?

This is a homework question. I'm not expecting an answer, just some guidance, possibly :) I am to show that log(n!) = Θ(n·log(n)). A hint was given that I should show the upper bound with nn and ...
6k views

### Quicksort superiority over Heap Sort

Heap Sort has a worst case complexity is O(nlog) n wnile Quicksort is O(n^2). But emperical evidences say quicksort is superior. Why is that??
7k views

### Is Big O(logn) log base e?

For binary search tree type of data structures, I see the Big O notation is typically noted as O(logn). With a lowercase 'l' in log, does this imply log base e (n) as described by the natural ...
5k views

### Can hash tables really be O(1)

It seems to be common knowledge that hash tables can achieve O(1) but that has never made sense to me. Can someone please explain it? A. The value is an int smaller than the size of the hash table, ...
583 views

### What is big-O notation? How do you come up with figures like O(n)? [duplicate]

Possible Duplicate: Plain english explanation of Big O I'd imagine this is probably something taught in classes, but as I a self-taught programmer, I've only seen it rarely. I've gathered ...
3k views

### Efficiently finding the intersection of a variable number of sets of strings

I have a variable number of ArrayList's that I need to find the intersection of. A realistic cap on the number of sets of strings is probably around 35 but could be more. I don't want any code, just ...
11k views

### Big O Notation Homework--Code Fragment Algorithm Analysis? [closed]

For homework, I was given the following 8 code fragments to analyze and give a Big-Oh notation for the running time. Can anybody please tell me if I'm on the right track? //Fragment 1 for(int i = ...
10k views

### How to calculate order (big O) for more complex algorithms (ie quicksort)

I know there are quite a bunch of questions about big O notation, I have already checked Plain english explanation of Big O , Big O, how do you calculate/approximate it?, and Big O Notation ...
11k views

### A range intersection algorithm better than O(n)?

Range intersection is a simple, but non-trivial problem. Its has been answered twice already: http://stackoverflow.com/questions/224878/find-number-range-intersection ...
3k views

### How can std::make_heap be implemented while making at most 3N comparisons?

I looked in to the C++0x standard and found the requirement that make_heap should do no more than 3*N comparisons. I.e. heapify an unordered collection can be done in O(N) /* @brief Construct ...
5k views

### Levenshtein Distance Algorithm better than O(n*m)?

I have been looking for an advanced levenshtein distance algorithm, and the best I have found so far is O(n*m) where n and m are the lengths of the two strings. The reason why the algorithm is at this ...
7k views

### Why is inserting in the middle of a linked list O(1)?

According to the Wikipedia article on linked lists, inserting in the middle of a linked list is considered O(1). I would think it would be O(n). Wouldn't you need to locate the node which could be ...
1k views

### which algorithm can do a stable in-place binary partition with only O(N) moves?

I'm trying to understand this paper: Stable minimum space partitioning in linear time. It seems that a critical part of the claim is that Algorithm B sorts stably a bit-array of size n in ...
2k views

### The amortized complexity of std::next_permutation?

I just read this other question about the complexity of next_permutation and while I'm satisfied with the response (O(n)), it seems like the algorithm might have a nice amortized analysis that shows a ...
2k views

### What is the complexity of this simple piece of code?

I'm pasting this text from an ebook I have. It says the complexity if O(n2) and also gives an explanation for it, but I fail to see how. Question: What is the running time of this code? public ...
3k views

### If f(n) = O(g(n)) , then is exp(f(n)) = O(exp(g(n)))

can someone help me with the above. Please give example. Also, if you use l'Hôpital's rule, please show how you do differentiation. Thanks folks
2k views

### Big O Notation: differences between O(n^2) and O(n.log(n))?

What is the difference between O(n^2) and O(n.log(n))?
521 views

### Sub O(n^2) algorithm for counting nested intervals?

We have a list of intervals of the form [ai, bi]. For each interval, we want to count the number of other intervals that are nested within it. For example, if we had two intervals, A = [1,4] and B ...
5k views

### How is the complexity of bucket sort is O(n+k) if we implement buckets using linked lists?

I am curious about why bucket sort has a runtime of O(n + k) if we use buckets implemented with linked lists. For example, suppose that we have this input: n = no of element= 8 k = range = 3 array ...
465 views

### Complexity. Why dont constants matter?

Can someone please explain to me in a simple way why constants don't matter when it comes to big O notation? Why does the complexity stay the same when you add a constant. This is not a homework ...