Differential Geometry: "First eigenvalue of the p-Laplace operator on Riemann and Kahler manifolds"

Dr. Shoo Seto, UCSB

The Laplace eigenvalue equation arises as the critical point of the normalized L^2 energy functional. The generalization to the L^p energy functional gives rise to the p-Laplace eigenvalue equation. We survey some results of the first eigenvalue of the p-Laplace operator on Riemann and Kahler manifolds. Results we discuss include joint work with Guofang Wei and Casey Blacker.

Friday, April 20 at 11:10am to 12:00pm

Campus Surge, 268

Event Type

Seminars

Audience

General Public, Graduate Students, Undergraduate Students, International Students, Transfer Students

Website

http://mathdept.ucr.edu/research/rese...

Department
Mathematics
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