比利时vs摩洛哥足彩
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university of california san diego
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math 292 - topology seminar
guchuan li
university of michigan
vanishing results in chromatic homotopy theory at prime 2
abstract:
chromatic homotopy theory is a powerful tool to study periodic phenomena in the stable homotopy groups of spheres. under this framework, the homotopy groups of spheres can be built from the fixed points of lubin--tate theories $e_h$. these fixed points are computed via homotopy fixed points spectral sequences. in this talk, we prove that at the prime 2, for all heights $h$ and all finite subgroups $g$ of the morava stabilizer group, the $g$-homotopy fixed point spectral sequence of $e_h$ collapses after the $n(h,g)$-page and admits a horizontal vanishing line of filtration $n(h,g)$.
this vanishing result has proven to be computationally powerful, as demonstrated by hill--shi--wang--xu’s recent computation of $e_4^{hc_4}$. our proof uses new equivariant techniques developed by hill--hopkins--ravenel in their solution of the kervaire invariant one problem. as an application, we extend kitchloo--wilson’s $e_n^{hc_2}$-orientation results to all $e_n^{hg}$-orientations at the prime 2. this is joint work with zhipeng duan and xiaolin danny shi.
host: zhouli xu
february 22, 2022
1:00 pm
https://ucsd.zoom.us/j/99777474063
password: topology
research areas
geometry and topology****************************