Department of Mathematics,
University of California San Diego
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Math 211 B00 - Group Actions Seminar
Pratyush Sarkar
Yale University
Generalization of Selberg's 3/16 theorem for convex cocompact thin subgroups of SO(n, 1)
Abstract:
Selberg’s 3/16 theorem for congruence covers of the modular surface is a beautiful theorem which has a natural dynamical interpretation as uniform exponential mixing. Bourgain-Gamburd-Sarnak's breakthrough works initiated many recent developments to generalize Selberg's theorem for infinite volume hyperbolic manifolds. One such result is by Oh-Winter establishing uniform exponential mixing for convex cocompact hyperbolic surfaces. These are not only interesting in and of itself but can also be used for a wide range of applications including uniform resonance free regions for the resolvent of the Laplacian, affine sieve, and prime geodesic theorems. I will present a further generalization to higher dimensions and some of these immediate consequences.
Host: Brandon Seward
October 21, 2021
12:00 PM
Zoom ID 967 4109 3409 (email an organizer for the password)
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