Joint IAS/Princeton Arithmetic Geometry Seminar

Witt-Differential Operators

We describe a new theory of sheaves of rings of differential operators on the Witt-vectors on a smooth scheme characteristic p. Roughly speaking, these sheaves are to the de Rham-Witt complex as the usual sheaf of differential operators is to the de Rham complex. Further, the module theory of these rings generalizes and extends the category of crystals; we will explain how the associated formalism gives very general comparison theorems between crystalline cohomology of a crystal and the the de Rham-Witt cohomology with values in that crystal. 

Date & Time

February 19, 2024 | 3:30pm – 4:30pm

Location

Simonyi Hall 101

Speakers

Christopher Dodd, University of Illinois Urbana-Champaign

Event Series