An estimate for F-jumping numbers via the roots of the Bernstein-Sato polynomial

Abstract

Given a smooth complex algebraic variety X and a nonzero regular function f on X, we give an effective estimate for the difference between the jumping numbers of f and the F-jumping numbers of a reduction fp of f to characteristic p 0, in terms of the roots of the Bernstein-Sato polynomial bf of f. As an application, we show that if bf has no roots of the form - lct(f)-n, with n a positive integer, then the F-pure threshold of fp is equal to the log canonical threshold of f for p 0 with (p-1) lct(f)∈ Z.