Cyclic forms on DG-Lie algebroids and semiregularity

Abstract

Given a transitive DG-Lie algebroid (A, ) over a smooth separated scheme X of finite type over a field K of characteristic 0 we define a notion of connection ∇ R(X,Ker ) R (X,X1[-1] Ker ) and construct an L∞ morphism between DG-Lie algebras f R(X, Ker ) R(X, X≤ 1 [2]) associated to a connection and to a cyclic form on the DG-Lie algebroid. In this way, we obtain a lifting of the first component of the modified Buchweitz-Flenner semiregularity map in the algebraic context, which has an application to the deformation theory of coherent sheaves on X admitting a finite locally free resolution. Another application is to the deformations of (Zariski) principal bundles on X.