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I have the following question, and it screams at me for a solution with hashing:

Problem :

Given a huge list of numbers, x1........xn where xi <= T, we'd like to know whether or not exists two indices i,j, where x_i == x_j.
Find an algorithm in O(n) run time, and also with expectancy of O(n), for the problem.

My solution at the moment : We use hashing, where we'll have a mapping function h(x) using chaining.

First - we build a new array, let's call it A, where each cell is a linked list - this would be the destination array.

Now - we run on all the n numbers and map each element in x1........xn, to its rightful place, using the hash function. This would take O(n) run time.

After that we'll run on A, and look for collisions. If we'll find a cell where length(A[k]) > 1 then we return the xi and xj that were mapped to the value that's stored in A[k] - total run time here would be O(n) for the worst case , if the mapped value of two numbers (if they indeed exist) in the last cell of A.

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Hashing will also require O(n) space. Is this allowed? (considering it's a huge list of numbers) –  Groo Jun 20 '12 at 9:27
    
@Goo: Nothing is said about the space , then I guess that that goes without saying . –  ron Jun 20 '12 at 9:29
    
Is T < N ? Are you allowed to shuffle / alter / distroy the array ? –  wildplasser Jun 20 '12 at 9:34
    
Hashing cannot really give you O(n) run time, only O(n) expected run time. Imagine what happens if all the numbers map to the same hash value. –  n.m. Jun 20 '12 at 9:36

1 Answer 1

up vote 3 down vote accepted

The same approach can be ~twice faster (on average), still O(n) on average - but with better constants.

No need to map all the elements into the hash and then go over it - a faster solution could be:

for each element e:
  if e is in the table:
      return e
  else:
    insert e into the table

Also note that if T < n, there must be a dupe within the first T+1 elements, from pigeonhole principle.
Also for small T, you can use a simple array of size T, no hash is needed (hash(x) = x). Initializing T can be done in O(1) to contain zeros as initial values.

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+1 Since the algorithm indicates that xi <= T, it's likely they had a plain array in mind. –  Groo Jun 20 '12 at 9:47

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