A New Result on Packing Unit Squares into a Large Square

Abstract

In their 2009 note: Packing equal squares into a large square, Chung and Graham proved that the uncovered area of a large square of side length x is O(x(3+2)/7 x) after maximum number of non-overlapping unit squares are packed into it, which improved the earlier results of Erdos-Graham, Roth-Vaughan, and Karabash-Soifer. Here we further improve the result to O(x5/8) that also helps to improve the bound for the dual problem: finding the minimum number of unit squares needed for covering the large square, from x2+O(x(3+2)/7 x) to x2+O(x5/8).