Approximation properties of -expansions II

Baker, Simon

doi:10.1017/etds.2016.108

Cited by 3 publications

(3 citation statements)

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“…In a series of recent papers, the first author established that for many IFSs we do observe Khintchine like behaviour, i.e. (2.1) holds for some suitable class of Ψ, see [2,3,4,5]. Related results had appeared previously in papers of Persson and Reeve [29,30], and Levesley, Salp, and Velani [25].…”

Section: Overlapping Iterated Function Systems From the Perspective O...mentioning

confidence: 73%

“…Khintchine's theorem is an important result in number theory which demonstrates that the Lebesgue measure of certain limsup sets defined using the rationals is determined by the convergence/divergence of naturally occurring volume sums. Inspired by this result, the first author studied fractal analogues of Khintchine's theorem where the role of the rationals is played by a natural set of points that is generated by the underlying iterated function system [2,3,4,5]. The results of [5] demonstrate that for many parameterised families of overlapping iterated function systems, we typically observe Khintchine like behaviour.…”

Section: Introductionmentioning

confidence: 99%

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Analogues of Khintchine’s theorem for random attractors

Baker¹,

Troscheit²

2021

Preprint

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Section: Overlapping Iterated Function Systems From the Perspective O...mentioning

confidence: 73%

Section: Introductionmentioning

confidence: 99%

Analogues of Khintchine’s theorem for random attractors

Baker¹,

Troscheit²

2021

Preprint

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“…Remark 1. 4 The inequality (1.4) and the non-increasing assumption on g in Statement 2 are both technical assumptions and are believed to be non-optimal. Note that in Statement 3 there are no monotonicity conditions imposed on g. We expect that both of these assumptions can be removed.…”

Section: Remark 13 Ifmentioning

confidence: 99%

Intrinsic Diophantine approximation for overlapping iterated function systems

Baker

2023

Math. Ann.

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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 in terms of its eventually periodic representations. For limsup sets defined with respect to this height function, we obtain a detailed description of their metric properties. The results of this paper hold in arbitrary dimensions and without any separation conditions on the underlying iterated function system.

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Overlapping Iterated Function Systems from the Perspective of Metric Number Theory

Baker¹

2023

Memoirs of the AMS

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In this paper we develop a new approach for studying overlapping iterated function systems. This approach is inspired by a famous result due to Khintchine from Diophantine approximation which shows that for a family of limsup sets, their Lebesgue measure is determined by the convergence or divergence of naturally occurring volume sums. For many parameterised families of overlapping iterated function systems, we prove that a typical member will exhibit similar Khintchine like behaviour. Families of iterated function systems that our results apply to include those arising from Bernoulli convolutions, the { 0 , 1 , 3 } \{0,1,3\} problem, and affine contractions with varying translation parameter. As a by-product of our analysis we obtain new proofs of some well known results due to Solomyak on the absolute continuity of Bernoulli convolutions, and when the attractor in the { 0 , 1 , 3 } \{0,1,3\} problem has positive Lebesgue measure. For each t ∈ [ 0 , 1 ] t\in [0,1] we let Φ t \Phi _t be the iterated function system given by Φ t ≔ { ϕ 1 ( x ) = x 2 , ϕ 2 ( x ) = x + 1 2 , ϕ 3 ( x ) = x + t 2 , ϕ 4 ( x ) = x + 1 + t 2 } . \begin{equation*} \Phi _{t}≔\Big \{\phi _1(x)=\frac {x}{2},\phi _2(x)=\frac {x+1}{2},\phi _3(x)=\frac {x+t}{2},\phi _{4}(x)=\frac {x+1+t}{2}\Big \}. \end{equation*} We prove that either Φ t \Phi _t contains an exact overlap, or we observe Khintchine like behaviour. Our analysis shows that by studying the metric properties of limsup sets, we can distinguish between the overlapping behaviour of iterated function systems in a way that is not available to us by simply studying properties of self-similar measures. Last of all, we introduce a property of an iterated function system that we call being consistently separated with respect to a measure. We prove that this property implies that the pushforward of the measure is absolutely continuous. We include several explicit examples of consistently separated iterated function systems.

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Approximation properties of -expansions II

Cited by 3 publications

References 23 publications

Analogues of Khintchine’s theorem for random attractors

Analogues of Khintchine’s theorem for random attractors

Intrinsic Diophantine approximation for overlapping iterated function systems

Overlapping Iterated Function Systems from the Perspective of Metric Number Theory

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