Friday, November 01, 2024
3:00 PM -
4:00 PM
Linde Hall 187
Geometry and Topology Seminar
The (fractional) Dehn twist coefficient and infinite-type surfaces
Hannah Turner,
School of Natural Sciences & Mathematics,
Stockton University,
The fractional Dehn twist coefficient (FDTC) is an invariant of a self-map of a surface which is some measure of how the map twists near a boundary component of the surface. It has mostly been studied for compact surfaces; in this setting the invariant is always a fraction. I will discuss work to extend this invariant to infinite-type surfaces and show that it has surprising properties in this setting. In particular, the invariant no longer needs to be a fraction - any real number amount of twisting can be achieved! I will also discuss a new set of examples of (tame) big mapping classes called wagon wheel maps which exhibit irrational twisting behavior. This is joint work in progress with Diana Hubbard and Peter Feller.
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For more information, please contact Math Department by phone at 626-395-4335 or by email at [email protected] or visit https://sites.google.com/site/caltechgtseminar/home.