Variational Methods in Geometry Seminar
The systole of large genus minimal surfaces in positive Ricci curvature
We prove that the systole (or more generally, any k-th homology systole) of a minimal surface in an ambient three manifold of positive Ricci curvature tends to zero as the genus of the minimal surfaces becomes unbounded. This is joint work with Anna Siffert.
Date & Time
January 29, 2019 | 3:30pm – 5:30pm
Location
Simonyi Hall 101Speakers
Henrik Matthiesen
Affiliation
University of Chicago