比利时vs摩洛哥足彩
,
university of california san diego
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math 258 - differential geometry
max engelstein
university of minnesota
the riemannian quantitative isoperimetric inequality
abstract:
the (euclidean) isoperimetric inequality says that any set has larger perimeter than a ball with the same area. the quantitative isoperimetric inequality says that the difference in perimeters is bounded from below by the square of the distance from our set e to the ``closest'' ball of the same area. in this talk, we will discuss an extension of this result to closed riemannian manifolds with analytic metrics. in particular, we show that a similar inequality holds but with the distance raised to a power that depends on the geometry. we also have examples which show that a greater power than two is sometimes necessary and that the analyticity condition is necessary. this is joint work with o. chodosh (stanford) and l. spolaor (ucsd).
host: lei ni
february 12, 2020
10:00 am
ap&m 6402
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