Geometry & Topology Seminar

Fundamental classes in motivic homotopy theory

  • Speaker: Fangzhou Jin (Tongji University)

  • Time: Dec 11, 2021, 10:00-11:00

  • Location: Zoom ID 830 0410 2799, Passcode 20211211

Abstract
We generalize Fulton's intersection theory to the setting of motivic homotopy theory by developing the theory of fundamental classes, and establish (refined) Gysin maps and an excess intersection formula. The construction applies to some non-orientable cohomology theories such as hermitian K-theory and higher Chow-Witt groups. We also develop a theory of Euler classes of vector bundles and prove a motivic Gauss–Bonnet formula, which computes refined Euler characteristics in quadratic forms. This is a joint work with F. Déglise and A. Khan.