I have searched every where for this but I can't understand why is it O(1+a/2) where a is the load factor. Can some one explain this step by step.
1 Answer
Let the number of elements in your hash table be n
.
It means there are n/a
total number of cells (/lines) in the hash table, each holds a list of elements. This is the definition of load factor.
So, the expected number of elements assossiated to each such cell is n/(n/a) = a
.
A linear search in an unsorted list needs to traverse half of the elements until it finds the correct one on average (and we assume it is a succesful search), so it needs to traverse a/2
elements.
The 1
factor comes from accessing the correct list in the hash table itself.
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A linear search in an unsorted list needs to traverse half of the elements. This is what i don't understand. Why is that so? It may be that required element is at the end of list so why we need to traverse only half? Apr 5, 2015 at 15:19
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1It's on average: sometimes it's the first, sometimes the last, on average it's half the number of elements. Apr 5, 2015 at 15:20
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1@user4129542 I omitted the word 'average', which is important here. Intuitively, it has 50% chance to be at last elements and 50% to be at firsts. (More thorough proof can be found in the proof the the expected value of uniform distribution of 0,...,U is U/2– amitApr 5, 2015 at 15:21