Perfectly packing a square by squares of nearly harmonic sidelength

Abstract

A well known open problem of Meir and Moser asks if the squares of sidelength 1/n for n ≥ 2 can be packed perfectly into a square of area Σn=2∞ 1n2 = π26-1. In this paper we show that for any 1/2 < t < 1, and any n0 that is sufficiently large depending on t, the squares of sidelength n-t for n ≥ n0 can be packed perfectly into a square of area Σn=n0∞ 1n2t. This was previously known (if one packs a rectangle instead of a square) for 1/2 < t ≤ 2/3 (in which case one can take n0=1).