Convergence of weak Kaehler-Ricci flows on minimal models of positive Kodaira dimension
Geometric Flows in Riemannian and Complex Geometry May 02, 2016 - May 06, 2016
Location: SLMath: Eisenbud Auditorium
complex geometry
Riemannian geometry
geometric analysis
geometric flow
Ricci flow
Kahler-Ricci flow
minimal model program
projective algebraic geometry
complex algebraic geometry
Kodaira dimension
51D25 - Lattices of subspaces and geometric closure systems [See also 05B35]
51D30 - Continuous geometries, geometric closure systems and related topics [See also 06Cxx]
32C81 - Applications of analytic spaces to physics and other areas of science
14504
Studying the behavior of the Kaehler-Ricci flow on mildly singular varieties, one is naturally lead to study weak solutions of degenerate parabolic complex Monge-Ampere equations. I will explain how viscosity methods allow one to define and study the long term behavior of the normalized Kaehler-Ricci flow on mildly singular varieties of positive Kodaira dimension, generalizing results of Song and Tian who dealt with smooth minimal models. This is joint work with P.Eyssidieux and A.Zeriahi
Guedj.Notes
|
Download |
14504
H.264 Video |
14504.mp4
|
Download |
Please report video problems to itsupport@slmath.org.
See more of our Streaming videos on our main VMath Videos page.