Bernstein-Sato polynomials and test modules in positive characteristic

Abstract

In analogy with the complex analytic case, Mustata constructed (a family of) Bernstein-Sato polynomials for the structure sheaf OX and a hypersurface (f=0) in X, where X is a regular variety over an F-finite field of positive characteristic (see arxiv:0711.3794). He shows that the suitably interpreted zeros of his Bernstein-Sato polynomials correspond to the jumping numbers of the test ideal filtration τ(X,ft). In the present paper we generalize Mustata's construction replacing OX by an arbitrary F-regular Cartier module M on X and show an analogous correspondence of the zeros of our Bernstein-Sato polynomials with the jumping numbers of the associated filtration of test modules τ(M,ft) provided that f is a non-zero divisor on M.