Annihilators of D-modules in mixed characteristic
Abstract
Let R be a polynomial or formal power series ring with coefficients in a DVR V of mixed characteristic with a uniformizer π. We prove that the R-module annihilator of any nonzero (R,V)-module is either zero or is generated by a power of π. In contrast to the equicharacteristic case, nonzero annihilators can occur; we give an example of a top local cohomology module of the ring Z2[[x0, …, x5]] that is annihilated by 2, thereby answering a question of Hochster in the negative.
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