An Existential Proof of the Conjecture on Packing Anchored Rectangles

Abstract

Let Pn be a set of n points, including the origin, in the unit square U = [0,1]2. We consider the problem of constructing n axis-parallel and mutually disjoint rectangles inside U such that the bottom-left corner of each rectangle coincides with a point in Pn and the total area covered by the rectangles is maximized ibmpuzzle, Winkler2007, Winkler2010a, Winkler2010b. The longstanding conjecture has been that at least half of U can be covered when such rectangles are properly placed. In this paper, we give an existential proof of the conjecture.