Intrinsic Diophantine approximation for overlapping iterated function systems

Baker, Simon

doi:10.1007/s00208-023-02608-8

Math. Ann.

2023

DOI: 10.1007/s00208-023-02608-8

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Intrinsic Diophantine approximation for overlapping iterated function systems

Simon Baker

Abstract: In this paper we study a family of limsup sets that are defined using iterated function systems. Our main result is an analogue of Khintchine’s theorem for these sets. We then apply this result to the topic of intrinsic Diophantine Approximation on self-similar sets. In particular, we define a new height function for an element of $${\mathbb {Q}}^d$$ Q d contained in a self-similar set i… Show more

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2024

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Approximating elements of the middle third Cantor set with dyadic rationals

Baker

2024

Isr. J. Math.

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Let C be the middle third Cantor set and μ be the $$\frac{\log\;2}{\log\;3}$$ log 2 log 3 -dimensional Hausdorff measure restricted to C. In this paper we study approximations of elements of C by dyadic rationals. Our main result implies that for μ almost every x ∈ C we have $$\# \left\{{1 \le n \le N:\left| {x - {p \over {{2^n}}}} \right| \le {1 \over {{n^{0.01}} \cdot {2^n}}}\,{\rm{for}}\,{\rm{some}}\,p \in \mathbb{N}} \right\}\sim2\sum\limits_{n = 1}^N {{n^{- 0.01}}}.$$ # { 1 ≤ n ≤ N : ∣ x − p 2 n ∣ ≤ 1 n 0.01 ⋅ 2 n f o r s o m e p ∈ N } ∼ 2 ∑ n = 1 N n − 0.01 . This improves upon a recent result of Allen, Chow, and Yu which gives a sub-logarithmic improvement over the trivial approximation rate.

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Approximating elements of the middle third Cantor set with dyadic rationals

Baker

2024

Isr. J. Math.

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Intrinsic Diophantine approximation for overlapping iterated function systems

Cited by 1 publication

References 33 publications

Approximating elements of the middle third Cantor set with dyadic rationals

Approximating elements of the middle third Cantor set with dyadic rationals

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