The log canonical threshold and rational singularities

Abstract

We show that if f is a nonzero, noninvertible function on a smooth complex variety X and Jf is the Jacobian ideal of f, then lct(f,Jf2)>1 if and only if the hypersurface defined by f has rational singularities. Moreover, if it does not have rational singularities, then lct(f,Jf2)= lct(f). We give two proofs, one relying on arc spaces and one that goes through the inequality α(f)≥ lct(f,Jf2), where α(f) is the minimal exponent of f. In the case of a polynomial over Q, we also prove an analogue of this latter inequality, with α(f) replaced by the motivic oscillation index moi(f). We also show a part of Igusa's strong monodromy conjecture, for poles larger than - lct(f,Jf2). We end with a discussion of lct-maximal ideals: these are ideals I with the property that lct(I)< lct(J) for every J with I⊂neq J.