The Prophet and the Voronoi Diagram

Abstract

Consider a stream of n random points (say, from the unit square) arriving one by one, where a player has to make an irreversible immediate decision for each arriving point whether to pick it. The player has to pick a single point, and the payoff is the area of the cell of the picked point, in the final Voronoi diagram of all the points. We show that there is a simple strategy so that with probability ≥ 1 - O(1/n), the player's payoff is only a constant factor smaller than the optimal choice (i.e., the one made by the prophet). This competitiveness is somewhat surprising, as this payoff is larger by a factor of ( n) than the average payoff.