Hodge filtration and Hodge ideals for Q-divisors with weighted homogeneous isolated singularities

Abstract

We give an explicit formula for the Hodge filtration on the DX-module OX(*Z)f1-α associated to the effective Q-divisor D=α· Z, where 0<α1 and Z=(f=0) is an irreducible hypersurface defined by f, a weighted homogeneous polynomial with an isolated singularity at the origin. In particular this gives a formula for the Hodge ideals of D. We deduce a formula for the generating level of the Hodge filtration, as well as further properties of Hodge ideals in this setting. We also extend the main theorem to the case when f is a germ of holomorphic function that is convenient and has non-degenerate Newton boundary.