English

Arithmetics in numeration systems with negative quadratic base

Number Theory 2010-11-08 v1 Discrete Mathematics

Abstract

We consider positional numeration system with negative base β-\beta, as introduced by Ito and Sadahiro. In particular, we focus on arithmetical properties of such systems when β\beta is a quadratic Pisot number. We study a class of roots β>1\beta>1 of polynomials x2mxnx^2-mx-n, mn1m\geq n\geq 1, and show that in this case the set Fin(β){\rm Fin}(-\beta) of finite (β)(-\beta)-expansions is closed under addition, although it is not closed under subtraction. A particular example is β=τ=12(1+5)\beta=\tau=\frac12(1+\sqrt5), the golden ratio. For such β\beta, we determine the exact bound on the number of fractional digits appearing in arithmetical operations. We also show that the set of (τ)(-\tau)-integers coincides on the positive half-line with the set of (τ2)(\tau^2)-integers.

Keywords

Cite

@article{arxiv.1011.1403,
  title  = {Arithmetics in numeration systems with negative quadratic base},
  author = {Z. Masáková and T. Vávra},
  journal= {arXiv preprint arXiv:1011.1403},
  year   = {2010}
}
R2 v1 2026-06-21T16:39:35.541Z