A zero-one Law for improvements to Dirichlet's Theorem
Abstract
We give an integrability condition on a function guaranteeing that for almost all (or almost no) x∈R, the system |qx-p|≤ (t), |q|<t is solvable in p∈ Z, q∈ Z \0\ for sufficiently large t. Along the way, we characterize such x in terms of the growth of their continued fraction entries, and we establish that Dirichlet's Approximation Theorem is sharp in a very strong sense. Higher-dimensional generalizations are discussed at the end of the paper.
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