On an uncountable family of graphs whose spectrum is a Cantor set
Abstract
For each p≥ 1, the star automaton group GSp is an automaton group which can be defined starting from a star graph on p+1 vertices. We study Schreier graphs associated with the action of the group GSp on the regular rooted tree Tp+1 of degree p+1 and on its boundary ∂ Tp+1. With the transitive action on the n-th level of Tp+1 is associated a finite Schreier graph pn, whereas there exist uncountably many orbits of the action on the boundary, represented by infinite Schreier graphs which are obtained as limits of the sequence \np\n≥ 1 in the Gromov-Hausdorff topology. We obtain an explicit description of the spectrum of the graphs \np\n≥ 1. Then, by using amenability of GSp, we prove that the spectrum of each infinite Schreier graph is the union of a Cantor set of zero Lebesgue measure, which is the Julia set of the quadratic map fp(z) = z2-2(p-1)z -2p, and a countable collection of isolated points supporting the KNS spectral measure. We also give a complete classification of the infinite Schreier graphs up to isomorphism of unrooted graphs, showing that they may have 1, 2 or 2p ends, and that the case of 1 end is generic with respect to the uniform measure on ∂ Tp+1.
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