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Models of Lubin-Tate spectra via real bordism theory

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Mingcong Zeng
Fre, 2020-03-13 15:30 - 16:30
MPIM Lecture Hall

In this talk, I will present models of Lubin-Tate theories at $p=2$ and all heights. These models come with explicit formulas for some finite subgroups of the Morava stabilizer groups on the coefficient rings. The construction utilizes equivariant formal group laws and are based on techniques of Hill-Hopkins-Ravenel. I will also talk about implications of the theorem, such as periodicity and differentials in spectral sequences. This is joint work with Beaudry, Hill and Shi.

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