Twisted Diophantine approximation for matrix transformations of tori
Abstract
Consider a sequence of integral matrices A=(An)n∈, and a d-tuple function r=(r1,…,rd) (0,12). For a fixed vector α, we are interested in the set T α(A, r) of vectors β∈[0,1)d for which An α~~\!\!\!\!\!1 infinitely often lies in the box centred at β, with side lengths 2ri(n) in each coordinate direction. Under mild conditions on A and r, we prove a metric dichotomy for the size of T α(A, r), valid for almost every α with respect to any fractal measure with a certain polynomial Fourier decay rate. Furthermore, removing all restrictions on r, we establish a metric dichotomy for Lebesgue almost every α. This solves a variant of a conjecture of Gonz\'alez Robert, Hussain, Shulga and Ward [Conjecture 1.10, Bull. London Math. Soc. 2025]. Finally, we also establish a Jarn\'ik-type theorem for T α(A, r).
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