Speaker:
Professor Jeff Streets
Institution:
UC Irvine
Time:
Tuesday, February 14, 2012 - 4:00pm
Location:
RH 306
The L^2 norm of the Riemannian curvature tensor is a natural intrinsic analogue of the Yang-Mills energy in purely Riemannian geometry. To understand the structure of this functional, it is natural to consider the gradient flow. I will give an overview of the analytic theory behind this flow, and discuss some long time existence results in low dimensions. Finally I will mention some natural conjectures for this flow and their consequences.