Long time existence of minimizing movement solutions of Calabi flow

Friday, December 7, 2012 -
2:00pm to 3:00pm
In 1982 Calabi proposed studying gradient flow of the L^2 norm of the scalar curvature (now called Calabi flow) as a tool for finding canonical metrics within a given Kahler class. The main motivating conjecture behind this flow (due to Calabi-Chen) asserts the smooth long time existence of this flow with arbitrary initial data. By exploiting aspects of the Mabuchi-Semmes-Donaldson metric on the space of Kahler metrics I will construct a kind of weak solution to this flow, known as a minimizing movement, which exists for all time.
Speaker: 
Jeffrey Streets
UC Irvine
Event Location: 
Fine Hall 314