Multiple tilings associated to d-Bonacci beta-expansions
Abstract
Let β∈(1,2) be a Pisot unit and consider the symmetric β-expansions. We give a necessary and sufficient condition for the associated Rauzy fractals to form a tiling of the contractive hyperplane. For β a d-Bonacci number, i.e., Pisot root of xd-xd-1-…-x-1 we show that the Rauzy fractals form a multiple tiling with covering degree d-1.
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