The original problem was discussed in here: Algorithm to find special point k in O(n log n) time

Simply we have an algorithm that finds whether a set of points in the plane has a center of symmetry or not.

I wonder is there a way to prove a lower bound (nlogn) to this algorithm? I guess we need to use this algorithm to solve a simplier problem, such as sorting, element uniqueness, or set uniqueness, therefore we can conclude that if we can solve e.g. element uniqueness by using this algorithm, it can be at least nlogn.

It seems like the solution is something to do with element uniqueness, but i couldn't figure out a way to manipulate this into center of symmetry algorithm.