On a self-embedding problem for self-similar sets

Pub Date : 2024-02-14 DOI:10.1017/etds.2024.2

JIAN-CI XIAO

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引用次数: 0

Abstract

Let

$K\subset {\mathbb {R}}^d$

be a self-similar set generated by an iterated function system

$\{\varphi _i\}_{i=1}^m$

satisfying the strong separation condition and let f be a contracting similitude with

$f(K)\subseteq K$

. We show that

$f(K)$

is relatively open in K if all

$\varphi _i$

share a common contraction ratio and orthogonal part. We also provide a counterexample when the orthogonal parts are allowed to vary. This partially answers a question of Elekes, Keleti and Máthé [Ergod. Th. & Dynam. Sys.30 (2010), 399–440]. As a byproduct of our argument, when

$d=1$

and K admits two homogeneous generating iterated function systems satisfying the strong separation condition but with contraction ratios of opposite signs, we show that K is symmetric. This partially answers a question of Feng and Wang [Adv. Math.222 (2009), 1964–1981].

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关于自相似集合的自嵌入问题

让 $Ksubset {\mathbb {R}}^d$ 是由满足强分离条件的迭代函数系统 $\{\varphi _i}_{i=1}^m$ 生成的自相似集合，并让 f 是具有 $f(K)\subseteq K$ 的收缩相似。我们证明，如果所有 $\varphi _i$ 都有一个共同的收缩比和正交部分，那么 $f(K)$ 在 K 中是相对开放的。当允许正交部分变化时，我们还提供了一个反例。这部分回答了埃莱克斯、凯莱蒂和马特的一个问题[Ergod.作为我们论证的副产品，当 $d=1$ 且 K 包含两个满足强分离条件但收缩比符号相反的同质生成迭代函数系统时，我们证明 K 是对称的。这部分回答了冯和王的一个问题[Adv. Math.222 (2009), 1964-1981]。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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