A Purely Geometric Variant of the Gale-Berlekamp Switching Game

Abstract

We introduce the following variant of the Gale-Berlekamp switching game. Let P be a set of n noncollinear points in the plane, each of them having weight +1 or -1. At each step, we pick a line passing through at least two points of P, and switch the sign of every point p ∈ P. The objective is to maximize the total weight of the elements of P. We show that one can always achieve that this quantity is at least n - o(n), as n→∞, and at least n/3, for every n. Moreover, these can be attained by a polynomial time algorithm.

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