A Contracting Fractal Group, Schreier Graphs and The Spectra

Abstract

This paper explores a previously uncharted automaton group generated by a 5-state automaton (, A) acts by self-similarity on the regular rooted tree A* over a 2-letter alphabet set A. Group G has been subjected to several observations that reveal the self-similar G-action possesses several notable characteristics: it is a weak branch, contracting, fractal group, and satisfies the open set condition with an exponential growth rate in activity. The corresponding Schreier graphs of the group action on the binary rooted tree, for n≤ 12, are presented. Furthermore, we delve into a numerical approximation of the spectrum of the discrete Laplacian operator, which is defined on the limit Schreier graph =n→∞ n.

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