Inhomogeneous Diophantine Approximation on $M_0$-sets
Abstract
We prove new quantitative Schmidt-type theorem for Diophantine approximations with restraint denominators on fractals (more precisely, on -sets). Our theorems introduce a sharp balance condition between the growth rate of the sequence of denominators and the decay rate of the Fourier transform of a Rajchman measure. Among the other things, this allows applications to sequences of denominators of polynomial growth. In particular, we infer new inhomogeneous Khintchine-J\"arnik type theorems with restraint denominators for a broad family of denominator sequences. Furthermore, our results provide non-trivial lower bounds for Hausdorff dimensions of intersections of two sets of inhomogeneously well-approximable numbers with restraint denominators.
Cite
@article{arxiv.2401.08849,
title = {Inhomogeneous Diophantine Approximation on $M_0$-sets},
author = {Volodymyr Pavlenkov and Evgeniy Zorin},
journal= {arXiv preprint arXiv:2401.08849},
year = {2024}
}
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31 page