Multiplicatively badly approximable matrices up to logarithmic factors

Abstract

Let \|x\| denote the distance from x∈R to the nearest integer. In this paper, we prove an existence and density statement for matrices A∈Rm× n satisfying |q|∞ +∞Πj=1n\1,|qj|\(Πj=1n\1,|qj|\)m+n-1Πi=1m\|Aiq\|>0, where the vector q ranges in Zn and Ai are the rows of the matrix A. This result extends a previous result of Moshchevitin for 2-dimensional vectors to arbitrary dimension. The estimates needed to apply Moshchevitin's method to the case m>2 are not currently available. We therefore develop a substantially different method, that allows us to overcome this issue. We also generalise this existence result to the inhomogeneous setting. Matrices with the above property appear to have a very small sum of reciprocals of fractional parts. This fact helps us to shed light on a question raised by L\e and Vaaler, thereby proving some new estimates for such sums in higher dimension.