`O(n^2 * logn)`

can be achieved by:

- Sort the array - O(nlogn)
- iterate all pairs (O(n^2) of those) - and for each pair (x,y) do a binary search to see if you have:
`max{x,y} + abs(x-y)`

or `min{x,y} - abs(x-y)`

as an element.

Special care should be taken for pairs where `x==y`

- but it can be easily solved within the same time complexity.

Note that this solution will give you 1 occurance of each triplet (no duplicates).

(**EDIT:** by using a hash table (histogram if you care for the number of triplets ) and look in it instead of sorting the array and using binary search - you can reduce the time to `O(n^2)`

on average, with the cost of `O(n)`

additional space).

Without the 1 occurance drawback - it cannot be done better then `O(n^3)`

, because there could be `O(n^3)`

such triplets, for example in the array `[1,1,1,...,1]`

- you have `chose(3,n)`

such triplets.