Bernstein-Sato theory modulo pm
Abstract
For fixed prime integer p > 0 we develop a notion of Bernstein-Sato polynomial for polynomials with Z / pm-coefficients, compatible with existing theory in the case m = 1. We show that the ``roots" of such polynomials are rational and we show that the negative roots agree with those of the mod-p reduction. We give examples to show that, surprisingly, roots may be positive in this context. Moreover, our construction allows us to define a notion of ``strength" for roots by measuring p-torsion, and we show that ``strong" roots give rise to roots in characteristic zero through mod-p reduction.
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