PuSH - Publikationsserver des Helmholtz Zentrums München

Larson, D.R.* ; Massopust, P. ; Olafsson, G.*

Three-way tiling sets in two dimensions.

Acta Appl. Math. 108, 529-546 (2009)
Open Access Green möglich sobald Postprint bei der ZB eingereicht worden ist.
In this article we show that there exist measurable sets W subset of R-2 with finite measure that tile R-2 in a measurable way under the action of a expansive matrix A, an affine Weyl group (W) over tilde, and a full rank lattice (Gamma) over tilde subset of R-2. This note is follow- up research to the earlier article "Coxeter groups and wavelet sets" by the first and second authors, and is also relevant to the earlier article "Coxeter groups, wavelets, multiresolution and sampling" by M. Dobrescu and the third author. After writing these two articles, the three authors participated in a workshop at the Banff Center on "Operator methods in fractal analysis, wavelets and dynamical systems," December 2-7, 2006, organized by O. Bratteli, P. Jorgensen, D. Kribs, G. Olafsson, and S. Silvestrov, and discussed the interrelationships and differences between the articles, and worked on two open problems posed in the Larson-Massopust article. We solved part of Problem 2, including a surprising positive solution to a conjecture that was raised, and we present our results in this article.
Weitere Metriken?
Zusatzinfos bearbeiten [➜Einloggen]
Publikationstyp Artikel: Journalartikel
Dokumenttyp Wissenschaftlicher Artikel
Schlagwörter Affine Weyl groups; Tilings; Wavelet sets
ISSN (print) / ISBN 0167-8019
e-ISSN 1572-9036
Quellenangaben Band: 108, Heft: 3, Seiten: 529-546 Artikelnummer: , Supplement: ,
Verlag Springer
Begutachtungsstatus Peer reviewed