On a theory of the b-function in positive characteristic

Abstract

We present a theory of the b-function (or Bernstein-Sato polynomial) in positive characteristic. Let f be a non-constant polynomial with coefficients in a perfect field k of characteristic p>0. Its b-function bf is defined to be an ideal of the algebra of continuous k-valued functions on Zp. The zero-locus of the b-function is thus naturally interpreted as a subset of Zp, which we call the set of roots of bf. We prove that bf has finitely many roots and that they are negative rational numbers. Our construction builds on an earlier work of Mustata and is in terms of D-modules, where D is the ring of Grothendieck differential operators. We use the Frobenius to obtain finiteness properties of bf and relate it to the test ideals of f.