Indicial polynomials and b-functions of D-modules along arbitrary varieties and their computation

Abstract

We define an indicial polynomial of a D-module along an arbitrary subvariety as a generalization of both the classical indicial polynomial for a single linear differential equation and the Bernstein-Sato polynomial of a variety defined by Budur-Mustata-Saito. An indicial polynomial is also a generalization of the b-function of a D-module along a submanifold and can be used in the computation of the D-module theoretic inverse image by the embedding instead of the b-function. We consider properties of indicial polynomials and relations with b-functions. An indicial polynomial may exist even if the b-function does not, and gives the set of the roots of the b-function if it exists. Computation of an indicial polynomial is easier than the b-function and naturally includes the case with parameters.