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`

.

`O(n)`

space. Is this allowed? (considering it's ahugelist of numbers) – Groo Jun 20 '12 at 9:27expectedrun time. Imagine what happens if all the numbers map to the same hash value. – n.m. Jun 20 '12 at 9:36