Spectral Geometry Seminar - Tommy Murphy (CSU Fullerton)

Event Date: 

Friday, April 10, 2015 - 3:00pm to 4:00pm

Event Location: 

  • 6635 South Hall

Event Price: 


Event Contact: 

Lee Kennard

Email: kennard@math.ucsb.edu

  • Differential Geometry Seminar

The eigenvalues of the Laplacian encode fundamental geometric information about a Riemannian metric. As an example of their importance, I will discuss how they arose in work of Cao, Hamilton and Illmanan, together with joint work with Stuart Hall, concerning stability of Einstein manifolds and Ricci solitons. I will outline progress on these problems for Einstein metrics with large symmetry groups. We calculate bounds on the first non-zero eigenvalue for certain Hermitian-Einstein four manifolds. Similar ideas allow us estimate to the spectral gap (the distance between the first and second non-zero eigenvalues) for any toric Kaehler-Einstein manifold M in terms of the polytope associated to M. I will finish by discussing a numerical proof of the instability of the Chen-LeBrun-Weber metric.