Curved L-infinity algebras and lifts of torsors

Abstract

Consider an extension of finite dimensional nilpotent Lie algebras 0 h g g 0 (over a field k of characteristic zero) corresponding to an extension of unipotent algebraic groups 1 H G G 1. For a G-torsor P on an algebraic variety X over k, we study the problem of lifting P to G-torsor P. Fixing a trivialization of P on open subsets of an affine cover, we give the Cech complex of h-valued functions the structure of a curved L∞-algebra and define a curved version of the Deligne-Getzler groupoid. We show that this groupoid is isomorphic the groupoid of cocycle level G-lifts of P.