Filtration Relative, l'Id\'eal de Bernstein et ses pentes

Abstract

Let fi: X → C, for i integer between 1 and p , be analytic functions defined on a complex analytic variety X. Let us consider DX the ring of linear differential operators and DX [s1, …, sp] = CX [s1, …, sp] C DX. Let m be a section of a holonomic DX -Module. We denote B(m, x0, f1, …, fp) the ideal of C [s1, …, sp] constituted by the polynomials b satisfying in the neighborhood of x0 ∈ X : B (s1, …, sp) m f1 s1 … fp sp ∈ DX [s1, …, sp] \, m f1s1 + 1 … fpsp + 1 \; . This ideal is called Bernstein's ideal. C. Sabbah shows the existence for every x0 ∈ X of a finite set H of linear forms with coefficients in N , such that: ΠH ∈ H Πi ∈ I H (H (s1, …, sp) + αH , i) ∈ B (m, x0, f1, …, fp) \; , where αH,i are complex numbers. The purpose of this article is to show in particular the existence of a minimal set H . In addition, when m is a section of a holonomic regular DX-Module, we will precise geometrically this set from the characteristic variety of DX-Module generated by m. We introduce and study especially the relative characteristic variety of the DX [s1, …, sp] - Modules related to our problem. This allows to specify the structure of the Bernstein's ideals.