RUS  ENG JOURNALS   PEOPLE   ORGANISATIONS   CONFERENCES   SEMINARS   VIDEO LIBRARY   PACKAGE AMSBIB
 General information Latest issue Archive Search papers Search references RSS Latest issue Current issues Archive issues What is RSS

 Chebyshevskii Sb.: Year: Volume: Issue: Page: Find

 Chebyshevskii Sb., 2019, Volume 20, Issue 3, Pages 372–389 (Mi cheb818)

Generalized Rauzy tilings and bounded remainder sets

A. V. Shutov

Khabarovsk Division of the Institute for Applied Mathematics, Far Eastern Branch, Russian Academy of Sciences (Khabarovsk)

Abstract: Rauzy introduced a fractal set associted with the toric shift by the vector $(\beta^{-1},\beta^{-2})$, where $\beta$ is the real root of the equation $\beta^3=\beta^2+\beta+1$. He show that this fractal can be partitioned into three fractal sets that are bounded remaider sets with respect to the considered toric shift. Later, the introduced set was named as the Rauzy fractal. Further, many generalizations of Rauzy fractal are discovered. There are many applications of the generalized Rauzy fractals to problems in number theory, dynamical systems and combinatorics.
Zhuravlev propose an infinite sequence of tilings of the original Rauzy fractal and show that these tilings also consist of bounded remainder sets. In this paper we consider the problem of constructing similar tilings for the generalized Rauzy fractals associated with algebraic Pisot units.
We introduce an infinite sequence of tilings of the $d-1$-dimensional Rauzy fractals associated with the algebraic Pisot units of the degree $d$ into fractal sets of $d$ types. Each subsequent tiling is a subdivision of the previous one. Some results describing the self-similarity properties of the introduced tilings are proved.
Also, it is proved that the introduced tilings are so called generalized exchanding tilings with respect to some toric shift. In particular, the action of this shift on the tiling is reduced to exchanging of $d$ central tiles. As a corollary, we obtain that the Rauzy tiling of an arbitrary order consist of bounded remainder sets with respect to the considered toric shift.
In addition, some self-similarity property of the orbit of considered toric shift is established.

Keywords: Rauzy tilings, Rauzy fractals, Pisot numbers, bounded remainder sets.

 Funding Agency Grant Number Russian Science Foundation 19-11-00065 The study was carried out at the expense of a grant of the Russian scientific Foundation (project 19-11-00065).

DOI: https://doi.org/10.22405/2226-8383-2018-20-3-372-389

Full text: PDF file (692 kB)

UDC: 511
Accepted:12.11.2019

Citation: A. V. Shutov, “Generalized Rauzy tilings and bounded remainder sets”, Chebyshevskii Sb., 20:3 (2019), 372–389

Citation in format AMSBIB
\Bibitem{Shu19} \by A.~V.~Shutov \paper Generalized Rauzy tilings and bounded remainder sets \jour Chebyshevskii Sb. \yr 2019 \vol 20 \issue 3 \pages 372--389 \mathnet{http://mi.mathnet.ru/cheb818} \crossref{https://doi.org/10.22405/2226-8383-2018-20-3-372-389}