Prof. M.S. Raghunathan

Description
Title: Compact forms of spaces of constant negative (sectional) curvature.

Abstract: One knows that any compact riemann surface of genus > 2 carries
a riemanniann metric of constant curvature. In higher dimension even the
existence of compact manifolds of constant negative curvature is by no
means that abundant. In this lecture we will show how arithmetic enables us
to construct such manifolds in every dimension greater than equal to 2.
Description
Room 215
Date
Fri, March 31, 2017
Start Time
3:00pm IST
Priority
5-Medium
Access
Public
Created by
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Updated
Mon, March 27, 2017 2:55pm IST