The Dynamics seminar meets in room B329 of Van Vleck Hall on Mondays from 2:30pm - 3:20pm. To sign up for the mailing list send an email from your wisc.edu address to firstname.lastname@example.org. For more information, contact Paul Apisa, Marissa Loving, Caglar Uyanik, or Chenxi Wu. Contact Caglar Uyanik with your wisc email to get the zoom link for virtual talks.
|September 12||Jing Tao (OU)||Genericity of pseudo-Anosov maps||Dymarz and Uyanik|
|September 19||Rebekah Palmer (Temple)(virtual)||Totally geodesic surfaces in knot complements||VIRTUAL|
|September 26||Beibei Liu (MIT)||TBA||Dymarz|
|October 3||Grace Work (UW-Madison)||TBA||local|
|October 10||Jean Pierre Mutanguha (Princeton)||TBA||Uyanik|
|October 17||Anthony Sanchez (UCSD)||TBA||Uyanik|
|October 24||Alena Erchenko (U Chicago)||TBA||Uyanik and Work|
|October 31||Feng Zhu (UW Madison)||TBA||local|
|November 7||Ethan Farber (BC)||TBA||Loving|
|November 21||Harry Hyungryul Baik (KAIST)||TBA||Wu|
|December 5||MurphyKate Montee (Carleton)||TBA|
By Nielsen-Thurston classification, every homeomorphism of a surface is isotopic to one of three types: finite order, reducible, or pseudo-Anosov. While there are these three types, it is natural to wonder which type is more prevalent. In any reasonable way to sample matrices in SL(2,Z), irreducible matrices should be generic. One expects something similar for pseudo-Anosov maps. In joint work with Erlandsson and Souto, we define a notion of genericity and show that pseudo-Anosov maps are indeed generic. More precisely, we consider several "norms" on the mapping class group of the surface, and show that the proportion of pseudo-Anosov maps in a ball of radius r tends to 1 as r tends to infinity. The norms can be thought of as the natural analogues of matrix norms on SL(2,Z).
Studying totally geodesic surfaces has been essential in understanding the geometry and topology of hyperbolic 3-manifolds. Recently, Bader--Fisher--Miller--Stover showed that containing infinitely many such surfaces compels a manifold to be arithmetic. We are hence interested in counting totally geodesic surfaces in hyperbolic 3-manifolds in the finite (possibly zero) case. In joint work with Khánh Lê, we expand an obstruction, due to Calegari, to the existence of these surfaces. On the flipside, we prove the uniqueness of known totally geodesic surfaces by considering their behavior in the universal cover. This talk will explore this progress for both the uniqueness and the absence.
Jean Pierre Mutanguha
|March 27||Carolyn Abbott (Brandeis)||TBA||Dymarz and Uyanik|
|April 10||Jon Chaika (Utah)||TBA||Apisa and Uyanik|
|April 24||Priyam Patel (Utah)||TBA||Loving and Uyanik|
Archive of past Dynamics seminars