比利时vs摩洛哥足彩
,
university of california san diego
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differential geometry seminar
thomas murphy
csu fullerton
spectral geometry of toric einstein manifolds
abstract:
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.
host: paul bryan
april 23, 2015
10:00 am
ap&m 5829
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