An interview question:
Given two non-ordered integer sequences
b, their size is n, all numbers are randomly chosen: Exchange the elements of
b, such that the sum of the elements of
aminus the sum of the elements of
Given the example:
a = [ 5 1 3 ] b = [ 2 4 9 ]
The result is (1 + 2 + 3) - (4 + 5 + 9) = -12.
My algorithm: Sort them together and then put the first smallest
n ints in
a and left in
b. It is O(n lg n) in time and O(n) in space. I do not know how to improve it to an algorithm with O(n) in time and O(1) in space. O(1) means that we do not need more extra space except seq 1 and 2 themselves.
Any ideas ?
An alternative question would be: What if we need to minimize the absolute value of the differences (minimize
|sum(a) - sum(b)|)?
A python or C++ thinking is preferred.