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Vanishing lines in chromatic homotopy theory

  • 主讲人:Guchuan Li (Peking University)
  • 举办方: Beijing-Moscow Mathematics Colloquium
  • 时间: 2024-04-12 16:00 - 2024-04-12 17:00
  • 地点: online

Recording: https://disk.pku.edu.cn/link/AA3EC7E3FA894E42FC9B71B7C393F4CDA5

Valid Until: 2054-05-31 18:13

 

Abstract: Chromatic homotopy theory studies periodic phenomena in stable homotopy theory via  fixed points of Lubin--Tate theories. The homotopy groups of these homotopy fixed points are periodic and computed via homotopy fixed points spectral sequences. In this talk, we present a result of an upper bound of the complexity of these computations. In particular, at the prime 2, for any given height, and a finite subgroup of the Morava stabilizer group, we find a number N such that the homotopy fixed point spectral sequence of collapses after page N and admits a horizontal vanishing line of a certain filtration N. The proof uses new equivariant techniques developed by Hill--Hopkins--Ravenel in their solution of the Kervaire invariant one problem and has applications to computations. This is joint work with Zhipeng Duan and XiaoLin Danny Shi.

Bio: Guchuan Li is  presently an assistant professor at Peking University, Beijing, China. His research interest lies in algebraic topology, especially chromatic homotopy theory. He obtained his Ph.D. in mathematics from Northwestern University in 2019 under the supervision of Paul Goerss.

 

 

 

 

 

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