Tuesday, October 29, 2024 2:00 pm
-
3:00 pm
EDT (GMT -04:00)
Sumun Iyer, Carnegie Mellon University
Knaster continuum homeomorphism group
Knaster continua are a class of compact, connected, metrizable spaces. Each Knaster continuum is indecomposable-- it cannot be written as the union of two proper nontrivial sub continua. We consider the group Homeo(K) of all homeomorphisms of the universal Knaster continuum; this is a non-locally compact Polish group. We will describe some "large" topological group phenomena that occur in this group, in relation to the group's universal minimal flow and its generic elements.
MC 5479