Strong monodromy conjecture for defining polynomials of projective hypersurfaces having only weighted homogeneous isolated singularities

Abstract

Let Z⊂ Pn-1 be a hypersurface such that the associated reduced hypersurface Z red has only weighted homogeneous isolated singularities. In the case Z is a reduced curve or Z red has only homogeneous isolated singularities with n at least 4, we show that the strong monodromy conjecture for a defining polynomial f of Z follows from arxiv:1609.04801v1 using in the reduced curve case a formula of Denef and Loeser for Newton-nondegenerate polynomials of three variables (which can be deduced in the applied case from the one for the two variable case) together with known results about the strong monodromy conjecture in the two variable case. Here an amazing cancellation occurs so that possible counterexamples fail. We also show the relation between the pole orders of topological zeta function and the root multiplicities of Bernstein-Sato polynomial in the case Z has equimultiplicity and Z red has only weighted homogeneous singularities with n=3 or Z red has only homogeneous isolated singularities with n>3.