A Tannakian framework for G-displays and Rapoport-Zink spaces

Abstract

We develop a Tannakian framework for group-theoretic analogs of displays, originally introduced by B\"ultel and Pappas, and further studied by Lau. We use this framework to define Rapoport-Zink functors associated to triples (G,\μ\,[b]), where G is a flat affine group scheme over Zp and μ is a cocharacter of G defined over a finite unramified extension of Zp. We prove these functors give a quotient stack presented by Witt vector loop groups, thereby showing our definition generalizes the group-theoretic definition of Rapoport-Zink spaces given by B\"ultel and Pappas. As an application, we prove a special case of a conjecture of B\"ultel and Pappas by showing their definition coincides with that of Rapoport and Zink in the case of unramified EL-type local Shimura data.