Self-similarity of unions of self-similar sets and their translations

Abstract

In this paper, we explore the self-similarity of unions of self-similar sets and their translations. For N ∈ N and 0< β < 1/(N+1), let be the self-similar set generated by the IFS \[ \ φi(x)=β x + i 1-βN: i=0,1,…, N \. \] We provide a complete characterization of translation vectors t =(t0,t1, …, tm) ∈ Rm+1 with 0=t0 < t1 < ·s < tm for which the union j=0m (+tj) is a self-similar set, by determining the existence of cycles in associated directed graphs. This extends the result of [Derong Kong, Wenxia Li, Zhiqiang Wang, Yuanyuan Yao, Yunxiu Zhang. On the union of homogeneous symmetric Cantor set with its translations. Math. Z., 2024]. Additionally, we present two types of self-similar sets for which the union with their translations cannot be self-similar.