What is the minimum number of comparisons under best case for KMP Algorithm?

What is the minimum number of comparisons under best case scenario for KMP algorithm ?

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0, if the string you are searching in is empty. Can't think of a better scenario than that. –  rici Oct 20 '12 at 21:55
Its not constant, its O(n) where n is the length of text, and text length is 0 here, so n = 0. –  Ansari Oct 20 '12 at 23:32
It's clearly 0 in this case, but O(n) is not the same as n. For example, n+k (for any constant k) is O(n). O(n) is only a statement about limits, not a statement about particular value of n. In any event, KMP is certainly O(n) but in most scenarios the multiplier (for number of compares) is quite a bit less than 1.0. –  rici Oct 21 '12 at 1:01

Well, the minimum number of comparisons in best case would be the length of your string, meaning you found a match first try. The algorithm is O(n), meaning that the upper bound or worst case scenario would take n comparisons where n is the length of the string that you are searching. The wiki is pretty good. http://en.wikipedia.org/wiki/Knuth%E2%80%93Morris%E2%80%93Pratt_algorithm

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What i got from your answer is: If T is a string and P is a pattern, where |T| = n, |P| = m, If total number of shifts are S than at-most shifts will be m-1, and minimum shifts required are 1, IF total number of comparisons are n, than total would be O(n + S), as minimum shifts are 1, than it would be O(n). Example would be if T = xxa, and P = xx, than after first attempt with performing shift of 1 algo stops and total comparisons will be 3 (2 for 'xx' and 1 for a mismatch) ...........Correct me if i am wrong. –  Ansari Oct 20 '12 at 22:27
Aye matey ! :) That looks correct. –  laser_wizard Oct 20 '12 at 22:31
There won't be a mismatch in your example because P only has two characters –  alestanis Oct 20 '12 at 22:51
At initial alignment, algorithm first reports a match of 'xx' and performs a shift of 1 character to check if there are some other occurrences. After shift T[3] and P[2] will be compared which will be the mismatch and algorithm stops here. Clearly it is bounded by O(n) where n is the length of the text. –  Ansari Oct 20 '12 at 22:59
Normally the algorithm returns the first match so I don't see why you say it checks for T[3] –  alestanis Oct 20 '12 at 23:17
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The best case happens when the string you are looking for is located just at the beginning of your text string. In this case, if you are looking for a k letter string inside a n letter string, the best case number of comparisons would be k.

You also have to take into account the overhead of computing the table, based on your k letter word, that will allow you to know which letters to skip if you don't find a match. In any case, this construction is done in O(k).

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Say, i have a text and pattern like : T = xxabc P = xx In this case string length is 5 and pattern length is 2, than total comparisons are 4. Would it be the best case, as it does not looks like O(m) –  Ansari Oct 20 '12 at 22:09
Where are the four comparisons? You compare T[0] to P[0] then T[1] to P[1] and you're done. –  alestanis Oct 20 '12 at 22:49