T&G: Tamas Darvas (University of Maryland), Optimal asymptotic of the J functional with respect to the d_1 metric
Date:
Tue, 20/04/202118:00-19:00
תאריך:
ג', 20/04/202118:00-19:00
We consider the space of Kahler metrics on a compact Kahler manifold. This space is an infinite dimensional manifold, and admits many natural quantities describing its geometry. For example, it is known that the L^1 Finsler metric on this space has asymptotic growth comparable to the so-called J functional. We obtain sharp inequalities between the large scale asymptotic of the J functional with respect to this L^1 metric. Applications regarding the initial value problem for Mabuchi geodesic rays are presented (joint with K. Smith and E. George).
The Hebrew University websites utilize cookies to enhance user experience and analyze site usage. By continuing to browse these sites, you consent to our use of cookies.