Bigness of the tangent bundle of del Pezzo surfaces and D-simplicity

Abstract

We consider the question of simplicity of a ring R under the action of its ring of differential operators DR. We give examples to show that even when R is Gorenstein and has rational singularities R need not be a simple DR-module; for example, this is the case when R is the homogeneous coordinate ring of a smooth cubic surface. Our examples are homogeneous coordinate rings of smooth Fano varieties, and our proof proceeds by showing that the tangent bundle of such a variety need not be big. We also give a partial converse showing that when R is the homogeneous coordinate ring of a smooth projective variety X, embedded by some multiple of its canonical divisor, then simplicity of R as a DR-module implies that X is Fano and thus R has rational singularities.