-
Abstract
In joint work with Hugo Parlier and Hanh Vo we prove that, for sufficiently large k, the shortest closed geodesics on any hyperbolic surface with at least k self-intersections lie on an ideal pair of pants and are so-called corkscrew geodesics. These shortest possible geodesics have length 2 arccosh (2k+1). Previously the only known case was k=1, being the figure 8 on the ideal pair of pants. After giving some background we will outline the proof of this result.
Description
Geometry/Topology seminar
Friday, Feb. 3
12:00pm
WXLR A111
Speaker
Ara Basmajian
Professor of Mathematics
City University of New York (CUNY)
Location
WXLR A111