# Representing an integer as the sum of four squares

Given a positive integer `m`, find four integers `a`, `b`, `c`, `d` such that `a^2 + b^2 + c^2 + d^2 = m` in `O(m^2 log m)`. Extra space can be used.

I can think of an `O(m^3)` solution, but I am confused about the `O(m^2 logm)` solution..

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Is this homework? –  Anson Sep 26 '11 at 4:32
@Snoopy: I hope my edit matches what you intended to ask. If not, feel free to roll it back. –  Jim Lewis Sep 26 '11 at 4:52
I've added a homework tag, if this isn't, please feel free to remove it. –  brc Sep 26 '11 at 7:19

First hint:

What is the complexity of sorting squared elemnt from 1 to m^2

Second hint:

Have a look at this post for some help :

Break time, find any triple which matches pythagoras equation in O(n^2)

Third Hint:

If you need more help : (from yi_H response on the previous post):

I guess O(n^2 log n) would be to sort the numbers, take any two pairs (O(n^2)) and see whether there is c in the number for which c^2 = a^2 + b^2. You can do the lookup for c with binary search, that's O(log(n)).

author: yi_H

Now compare n and sqrt(m)

Hope you can figure out a solution with this.

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