比利时vs摩洛哥足彩
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university of california san diego
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math 258 - differential geometry seminar
zhouli xu
mit
smooth structures on spheres and stable homotopy groups of spheres
abstract:
how many smooth structures are there on a sphere? for dimensions at least 5, kervaire--milnor solved this problem in terms of another problem in algebraic topology: the computations of stable homotopy groups of spheres. in this talk, i will discuss recent progress on this problem in algebraic topology and its applications on smooth structures, which includes the following result with guozhen wang, building up on moise, kervaire--milnor, browder, hill--hopkins--ravenel: among all odd dimensions, the n-sphere has a unique smooth structure if and only if n = 1, 3, 5, 61. i will also discuss some recent progress towards the kervaire invariant problem in dimension 126.
host: lei ni
may 27, 2020
2:00 pm
zoom id: 747181629
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