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On univoque Pisot numbers

Abstract

We study Pisot numbers β∈(1,2)\beta \in (1, 2) which are univoque, i.e., such that there exists only one representation of 1 as 1=∑n≥1snβ−n1 = \sum_{n \geq 1} s_n\beta^{-n}, with sn∈{0,1}s_n \in \{0, 1\}. We prove in particular that there exists a smallest univoque Pisot number, which has degree 14. Furthermore we give the smallest limit point of the set of univoque Pisot numbers.Comment: Accepted by Mathematics of COmputatio

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    Last time updated on 25/03/2019