Bernstein-Sato polynomials of semi-weighted-homogeneous polynomials of nearly Brieskorn-Pham type

Abstract

Let f be a semi-weighted-homogeneous polynomial having an isolated singularity at 0. Let αf,k be the spectral numbers of f at 0. By Malgrange and Varchenko there are non-negative integers rk such that the αf,k-rk are the roots up to sign of the local Bernstein-Sato polynomial bf(s) divided by s+1. However, it is quite difficult to determine these shifts rk explicitly on the parameter space of μ-constant deformation of a weighted homogeneous polynomial. Assuming the latter is nearly Brieskorn-Pham type, we can obtain a very simple algorithm to determine these shifts, which can be realized by using Singular (or even C) without employing Gr\"obner bases. This implies a refinement of classical work of M. Kato and P. Cassou-Nogu\`es in two variable cases, showing that the stratification of the parameter space can be controlled by using the (partial) additive semigroup structure of the weights of parameters. As a corollary we get for instance a sufficient condition for all the shiftable roots of bf(s) to be shifted. We can also produce examples where the minimal root of bf(s) is quite distant from the others as well as examples of semi-homogeneous polynomials with roots of bf(s) nonconsecutive.