Minimal exponents of hyperplane sections: a conjecture of Teissier

Abstract

We prove a conjecture of Teissier asserting that if f has an isolated singularity at P and H is a smooth hypersurface through P, then αP(f)≥ αP(fH)+1θP(f)+1, where αP(f) and αP(fH) are the minimal exponents at P of f and fH, respectively, and θP(f) is an invariant obtained by comparing the integral closures of the powers of the Jacobian ideal of f and of the ideal defining P. The proof builds on the approaches of Loeser and Elduque-Mustata. The new ingredients are a result concerning the behavior of Hodge ideals with respect to finite maps and a result about the behavior of certain Hodge ideals for families of isolated singularities with constant Milnor number. In the opposite direction, we show that for every f, if H is a general hypersurface through P, then αP(f)≤ αP(fH)+1 multP(f), extending a result of Loeser from the case of isolated singularities.