Length of DXf-α in the isolated singularity case

Abstract

Let f be a convergent power series of n variables having an isolated singularity at 0. For a rational number α, setting (X,0)=( Cn,0), we show that the length of the DX-module DXf-α is given by α+rfδα+1. Here rf is the number of local irreducible components of f-1(0) (with rf=1 for n>2), α is the dimension of the graded piece GrVα of the V-filtration on the saturation of the Brieskorn lattice modulo the image of N:=∂tt-α on GrVα of the Gauss-Manin system, and δα:=1 if α∈ Z>0, and 0 otherwise. This theorem can be proved also by employing a generalization a recent formula of T. Bitoun in the integral exponent case. The theorem generalizes an assertion by T. Bitoun and T. Schedler in the weighted homogeneous case where the saturation coincides with the Brieskorn lattice and N=0. In the semi-weighted-homogeneous case, our theorem implies some sufficient conditions for their conjecture about the length of DXf-1 to hold or to fail.