Intersecting Cantor sets generated by Complex Radix Expansions
Neil MacVicar (Queen's University)
Abstract: Consider the classical middle third Cantor set. This is a self-similar set containing all the numbers in the unit interval which have a ternary expansion that avoids the digit 1. We can ask when the intersection of the Cantor set with a translate of itself is also self-similar. Sufficient and necessary conditions were given by Deng, He, and Wen in 2008. This question has also been generalized to classes of subsets of the unit interval. I plan to discuss how existing ideas can be used to address the question for certain self-similar sets with dimension greater than one. These ideas will be illustrated using a class of self-similar sets in the plane that can be realized as radix expansions in base $-n+i$ where $n$ is a positive integer. I will also discuss a property of the fractal dimensions of these kinds of intersections.
dynamical systemsnumber theory
Audience: researchers in the topic
Series comments: Description: Online seminar on numeration systems and related topics
For questions or subscribing to the mailing list, contact the organisers at numeration@irif.fr
| Organizers: | Shigeki Akiyama, Ayreena Bakhtawar, Karma Dajani, Kevin Hare, Hajime Kaneko, Niels Langeveld, Lingmin Liao, Wolfgang Steiner* |
| *contact for this listing |