An analogue of Khintchine's theorem for self-conformal sets

Author:

BAKER SIMON

Abstract

AbstractKhintchine's theorem is a classical result from metric number theory which relates the Lebesgue measure of certain limsup sets with the convergence/divergence of naturally occurring volume sums. In this paper we ask whether an analogous result holds for iterated function systems (IFS's). We say that an IFS is approximation regular if we observe Khintchine type behaviour, i.e., if the size of certain limsup sets defined using the IFS is determined by the convergence/divergence of naturally occurring sums. We prove that an IFS is approximation regular if it consists of conformal mappings and satisfies the open set condition. The divergence condition we introduce incorporates the inhomogeneity present within the IFS. We demonstrate via an example that such an approach is essential. We also formulate an analogue of the Duffin–Schaeffer conjecture and show that it holds for a set of full Hausdorff dimension.Combining our results with the mass transference principle of Beresnevich and Velani [4], we prove a general result that implies the existence of exceptional points within the attractor of our IFS. These points are exceptional in the sense that they are “very well approximated”. As a corollary of this result, we obtain a general solution to a problem of Mahler, and prove that there are badly approximable numbers that are very well approximated by quadratic irrationals.The ideas put forward in this paper are introduced in the general setting of iterated function systems that may contain overlaps. We believe that by viewing iterated function systems from the perspective of metric number theory, one can gain a greater insight into the extent to which they overlap. The results of this paper should be interpreted as a first step in this investigation.

Publisher

Cambridge University Press (CUP)

Subject

General Mathematics

Cited by 10 articles. 订阅此论文施引文献 订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献

1. Mahler’s question for intrinsic Diophantine approximation on triadic Cantor set: the divergence theory;Mathematische Zeitschrift;2023-11-23

2. Overlapping Iterated Function Systems from the Perspective of Metric Number Theory;Memoirs of the American Mathematical Society;2023-07

3. Intrinsic Diophantine approximation for overlapping iterated function systems;Mathematische Annalen;2023-03-22

4. Modified shrinking target problems on self-conformal sets;Journal of Mathematical Analysis and Applications;2023-01

5. Diophantine approximation in metric space;Bulletin of the London Mathematical Society;2022-12-02

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