Mixing endomorphisms on toroidal groups and their countable products
Dynamical Systems
2016-06-23 v1 Geometric Topology
Abstract
We show that all non-trivial continuous endomorphisms of the circle group are topologically mixing. We also show that there exists a large infinite class of continuous endomorphisms of any n-dimensional torus group which are topologically mixing. Lastly, we prove that any continuous endomorphism on an abelian polish semigroup (with an identity) can be extended in a natural way to a topologically mixing endomorphism on the countable infinite product of said semigroup. This shows that every countable infinite product of an abelian polish semigroup has a topologically mixing endomorphism and, in particular, the countable infinite toroidal group has infinitely many topologically mixing endomorphisms.
Cite
@article{arxiv.1606.06764,
title = {Mixing endomorphisms on toroidal groups and their countable products},
author = {John R. Burke and Leonardo Pinheiro},
journal= {arXiv preprint arXiv:1606.06764},
year = {2016}
}
Comments
9 pages