-modules and holomorphic Lie algebroid connections

Abstract

Let X be a complex smooth projective variety, and G a locally free sheaf on X. We show that there is a 1-to-1 correspondence between pairs (,), where is a sheaf of almost polynomial filtered algebras over X satisfying Simpson's axioms and : → _X G is an isomorphism, and pairs (L,), where L is a holomorphic Lie algebroid structure on G and is a class in F1H2(L,), the first Hodge filtration piece of the second cohomology of . As an application, we construct moduli spaces of semistable flat L-connections for any holomorphic Lie algebroid L. Particular examples of these are given by generalized holomorphic bundles for any generalized complex structure associated to a holomorphic Poisson manifold.