Central sets and substitutive dynamical systems |
| |
Authors: | Marcy Barge Luca Q Zamboni |
| |
Institution: | 1. Department of Mathematics, Montana State University, Bozeman, MT 59717-0240, USA;2. Université de Lyon, Université Lyon 1, CNRS UMR 5208, Institut Camille Jordan, 43 boulevard du 11 novembre 1918, F-69622 Villeurbanne Cedex, France;3. Department of Mathematics, FUNDIM, University of Turku, FIN-20014 Turku, Finland |
| |
Abstract: | In this paper we establish a new connection between central sets and the strong coincidence conjecture for fixed points of irreducible primitive substitutions of Pisot type. Central sets, first introduced by Furstenberg using notions from topological dynamics, constitute a special class of subsets of N possessing strong combinatorial properties: Each central set contains arbitrarily long arithmetic progressions, and solutions to all partition regular systems of homogeneous linear equations. We give an equivalent reformulation of the strong coincidence condition in terms of central sets and minimal idempotent ultrafilters in the Stone–?ech compactification βN. This provides a new arithmetical approach to an outstanding conjecture in tiling theory, the Pisot substitution conjecture . The results in this paper rely on interactions between different areas of mathematics, some of which had not previously been directly linked: They include the general theory of combinatorics on words, abstract numeration systems, tilings, topological dynamics and the algebraic/topological properties of Stone–?ech compactification of N. |
| |
Keywords: | primary 37B10 secondary 05D10 11A63 68R15 |
本文献已被 ScienceDirect 等数据库收录! |
|