Topology of the Random Fibonacci Tiling Space

Gähler F, Miro E (2014)
Acta Physica Polonica A 126(2): 564-567.

Download
No fulltext has been uploaded. References only!
Journal Article | Original Article | Published | English

No fulltext has been uploaded

Author
;
Abstract
We look at the topology of the tiling space of locally random Fibonacci substitution, which is defined as a -> ba with probability p, a -> ab with probability 1-p and b -> a for 0 < p < 1. We show that its Cech cohomology group is not finitely generated, in contrast to the case where random substitutions are applied globally.
Publishing Year
ISSN
PUB-ID

Cite this

Gähler F, Miro E. Topology of the Random Fibonacci Tiling Space. Acta Physica Polonica A. 2014;126(2):564-567.
Gähler, F., & Miro, E. (2014). Topology of the Random Fibonacci Tiling Space. Acta Physica Polonica A, 126(2), 564-567.
Gähler, F., and Miro, E. (2014). Topology of the Random Fibonacci Tiling Space. Acta Physica Polonica A 126, 564-567.
Gähler, F., & Miro, E., 2014. Topology of the Random Fibonacci Tiling Space. Acta Physica Polonica A, 126(2), p 564-567.
F. Gähler and E. Miro, “Topology of the Random Fibonacci Tiling Space”, Acta Physica Polonica A, vol. 126, 2014, pp. 564-567.
Gähler, F., Miro, E.: Topology of the Random Fibonacci Tiling Space. Acta Physica Polonica A. 126, 564-567 (2014).
Gähler, Franz, and Miro, E. “Topology of the Random Fibonacci Tiling Space”. Acta Physica Polonica A 126.2 (2014): 564-567.
This data publication is cited in the following publications:
This publication cites the following data publications:

Export

0 Marked Publications

Open Data PUB

Web of Science

View record in Web of Science®

Search this title in

Google Scholar