Mathematics – Number Theory
Scientific paper
2009-12-23
Mathematics
Number Theory
25 pages, 8 figures
Scientific paper
In this paper, we study representations of real numbers in the positional numeration system with negative basis, as introduced by Ito and Sadahiro. We focus on the set $\Z_{-\beta}$ of numbers whose representation uses only non-negative powers of $-\beta$, the so-called $(-\beta)$-integers. We describe the distances between consecutive elements of $\Z_{-\beta}$. In case that this set is non-trivial we associate to $\beta$ an infinite word $\boldsymbol{v}_{-\beta}$ over an (in general infinite) alphabet. The self-similarity of $\Z_{-\beta}$, i.e., the property $-\beta \Z_{-\beta}\subset \Z_{-\beta}$, allows us to find a morphism under which $\boldsymbol{v}_{-\beta}$ is invariant. On the example of two cubic irrational bases $\beta$ we demonstrate the difference between Rauzy fractals generated by $(-\beta)$-integers and by $\beta$-integers.
Ambrož Pavel
Dombek Daniel
Masáková Zuzana
Pelantová Edita
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