The Hausdorff dimension of the intersection of -well approximable numbers and self-similar sets
Abstract
Let :N→R+ be a monotonically non-increasing function, and let v:N→R+ be defined by v(q)=1/qv. In this article, we consider self-similar sets whose iterated function systems satisfy the open set condition. For functions that do not decrease too rapidly, we give a conjecturally sharp upper bound on the Hausdorff dimension of the intersection of -well approximable numbers and such self-similar sets. When =v for some v greater than 1 and sufficiently close to 1, we give a lower bound for this Hausdorff dimension, which asymptotically matches the upper bound as v 1. In particular, we show that the set of very well approximable numbers has full Hausdorff dimension within self-similar sets, thus confirming a conjecture of Levesley, Salp, and Velani.
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