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比利时vs摩洛哥足彩 ,
university of california san diego

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math 258 - differential geometry

luca spolaor

ucsd

epsilon-regularity for minimal surfaces near quadratica cones

abstract:

every area-minimizing hypercone having only an isolated singularity fits into a foliation by smooth, area-minimizing hypersurfaces asymptotic to the cone itself. in this talk i will present the following epsilon-regularity result: every minimal surfaces lying sufficiently close to a minimizing quadratic cone (for example, the simons' cone), is a perturbation of either the cone itself, or some leaf of its associated foliation. this result also implies the bernstein-type result of simon-solomon, which characterizes area-minimizing hypersurfaces asymptotic to a quadratic cone as either the cone itself, or some leaf of the foliation, and it also allows to study convergence to singular minimal hyper surfaces. this is a joint result with n. edelen.

october 9, 2019

2:00 pm

ap&m 5829

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