Abstract
We provide a complete classification of when the homeomorphism group of a stable surface, , has the Automatic continuity property: Any homomorphism from Homeo(Σ) to a separable group is necessarily continuous. This result descends to a classification of when the Mapping class group of Σ has the automatic continuity property. Towards this classification, we provide a general framework for proving automatic continuity for groups of homeomorphisms. Applying this framework, we also show that the homeomorphism group of any stable second countable Stone space has the automatic continuity property. Under the presence of stability this answers two questions of Mann.
- What is the automatic continuity property?
- What is a separable topological group?
https://arxiv.org/abs/2411.12927