Canonical Kahler metrics and the K-stability of projective varieties

Thursday, November 18, 2010 -
1:30pm to 3:30pm
The "standard conjectures" in Kahler geometry state that the existence of a canonical metric in a given Hodge class is equivalent to the stability of the associated projective model(s). There are several competing definitions of stability ( mainly due to Tian and Donaldson ) and various partial results linking these definitions to the sought after metric. I will give a survey/progress report of my own work on this problem. The reference for the talk is:
Sean T. Paul
University of Wisconsin, Madison
Event Location: 
Fine Hall 601