Schmidt's game, fractals, and orbits of toral endomorphisms

Abstract

Given an integer nonsingular n× n matrix M and a point y ∈ Rn/Zn, consider the set E(M,y) of vectors x∈ Rn such that y is not a limit point of the sequence \Mk x Zn: k∈N\. S.G. Dani showed in 1988 that whenever M is semisimple and y ∈ Qn/Zn, the set E(M,y) has full Hausdorff dimension. In this paper we strengthen this result, extending it to arbitrary y ∈ Rn/Zn and integer nonsingular M, and in fact replacing the sequence of powers of M by any lacunary sequence of (not necessarily integer) m× n matrices. Furthermore, we show that sets of the form E(M,y) and their generalizations always intersect with `sufficiently regular' fractal subsets of Rn. As an application we give an alternative proof of a recent result of Einsiedler and Tseng on badly approximable systems of affine forms.