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What is a bubble sort good for?
I'am sure every algorithm has its advantage and disadvantage, so how about buble sort compared to other sorting algorithm? (ofcourse I hope the answer is other than "easy to learn")
I'am sure every algorithm has its advantage and disadvantage, so how about buble sort compared to other sorting algorithm? (ofcourse I hope the answer is other than "easy to learn") 

marked as duplicate by Georg Fritzsche, EvilTeach, ShreevatsaR, Loki Astari, Ben Voigt Jul 18 '10 at 2:21This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question. 





Performancewise, Bubble Sort is not very good (O(n^2)). Here are some of it's advantages:



It's simple enough to play it out in school without it ending in a total mess: "If your left neighbor is taller than you, please switch places." 


It's easier to program. Even seasoned programmers get quick sort, heap sort, and merge sort wrong. Also it does not consume an extra log(n) to O(n) in stack space. Although you can implement heap sort non recursively. Basically the algorithms are this O(n^2) worst case performance Basically this is slower....
O(n * lg(n)) Generally the fastest sorting algorithms for general sorting when you don't know anything about the input (this has actually been proven to be a lower bound on sorting without knowing anything about the input):
O(n) sorts *Other Sorts: * There are many other sorts available. Things like shell sort, etc... the ones above are the more common. But anyway in reality the faster algorithms are often harder to implement. If someone told me to sort these numbers in 20 minutes without a library, I'd probably write selection sort. The more complex ones are easier to get wrong. And often require additional space. You have to evaluate the complexity, space, and time tradeoffs. Many programming languages have built in sorting libraries. Also one other thing to be careful of is whether a sort is stable or not. Basically if you have A, C, D, C, G, C will each C appear in order, or will the last C appear before one of the other C's. This is important if you are sorting on multiple fields. Ie if you sort by First Name and then last name (Alex Rodriguez, Jane Rodriguez, Betty Rodriguez)...first sort you'd get (Alex R, Betty R, Jane R). Second sort if it is stable you will get Alex R, Betty R, Jane R. If it is not stable, you could get any order. Generally Bubble and Insertion are easy to implement to be stable. Heap Sort and Quick Sort usually aren't stable. Merge sort is easy to implement as stable. This also factors into choices.... Also if you don't know O(n) notation, basically it is an upper bound on how many computations it takes. To give you an idea, to sort 20 items you are looking at around 400 operations with O(n^2) while with O(n * lg(n)) you are looking at 20 * approx 4.3 so around 86 operations. And for lg(n) you are looking at around 4.3. Anyway the larger the number gets the bigger this difference is. 10000 items is 133000 operations for n*lg(n) and 100000000 for n^2. For large lists using the slower sorts starts to become impractical. And of course O(n) is just 10,000. The number of operations is not exactly those numbers, but they speak to how fast it grows. Ie with just lg(n) you grow from 4.3 for 20 to 133000. With n you grow from 20 to 10000 with n * lgn you grow from 86 to 133000 and with n^2 you grow from 400 to 100000000. So basically as your lists get bigger the slower ones will reach a point where they can't do them but the faster ones can. Anyway having put it all in context I see the following advantages to bubble sort:
Anyway in libraries Quick Sort and Stable Merge sort seem to be the most popular. 


Bubble sort is the fastest way to sort a list of three items. With very few exceptions, all sorts degenerate into a form of bubble sort for lists of three. 


BubbleSort is faster than QuickSort (and almost every other sort) on already sorted lists ;) QuickSort's bestcase performance is O(N log N), BubbleSort's is O(N) ! Other than this exotic, I'd have to agree with Donald Knuth, The Art of Computer Programming, Vol. 3: Sorting and Searching:



Realistically you would never use it for anything other than very small lists. For a sufficiently small list the low overhead can make it superior to the fancier sorts. I'd never use it for more than a dozen items. 

