Misc. seminar - math

Date:
Apr
26
2024

Condensed Learning Seminar

Grothendieck-Riemann-Roch, Part I
Vadim Vologodsky
2:30pm|Princeton University, Fine Hall 314

Explain the formulation of the Grothendieck–Riemann–Roch theorem for analytic adic spaces: go through [And23, pp. 32-38] and define all relevant objects and maps. Before explaining the construction of the Chern class map, define the sheaf KU∧p on...

May
02
2024

What is...?

Wanchun Shen
1:00pm|Simonyi 101 and Remote Access

To Be Announced.

May
03
2024

Condensed Learning Seminar

Grothendieck-Riemann-Roch, Part II
Dmitry Kubrak
2:30pm|Princeton University, Fine Hall 314

Prove the Grothendieck–Riemann–Roch theorem: first prove [And23, Satz 6.12] and then explain the sketch of the proof on [And23, p. 38] by proving the relevant statements from the second half of [CS22, Lecture 15].