Smooth Modules over Lie Algebroids I
Abstract
A Lie algebroid on a variety X/k is an extension α: gX TX of the tangent sheaf both as OX-module and Lie algebra over the base field, with the obvious compatibilities; and given a Lie algebroid one has its associated ring of differential operators D(gX). Letting g'X be some Lie sub-algebroid of gX, a smooth coherent gX-module M is one in which any (locally defined) coherent OX-submodule M0 ⊂ M generates a g'X-submodule D(g'X)M0 that remains coherent over OX. Depending on the choice of g'X one gets in this way interesting classes of gX-modules, where probably the most important one is that of gX-modules with regular singularities. The paper is concerned with this notion of smoothness, including results about prolongation of smoothness over codimension ≥ 2, preservation of smoothness for inverse and direct images of gX-modules, and curve tests. In particular we treat gX-modules with regular singularities, generalizing some of the main theorems for D-modules with new and hopefully transparent proofs.
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