Two finiteness theorem for (a,b)-module

Abstract

We prove the following two results 1. For a proper holomorphic function f : X D of a complex manifold X on a disc such that \df = 0 \ ⊂ f-1(0), we construct, in a functorial way, for each integer p, a geometric (a,b)-module Ep \ associated to the (filtered) Gauss-Manin connexion of f. This first theorem is an existence/finiteness result which shows that geometric (a,b)-modules may be used in global situations. 2. For any regular (a,b)-module E we give an integer N(E), explicitely given from simple invariants of E, such that the isomorphism class of E/bN(E).E determines the isomorphism class of E. This second result allows to cut asymptotic expansions (in powers of b) \ of elements of E without loosing any information.