Hermitian (a, b)-modules and Saito's "higher residue pairings"

Abstract

Following the work of Daniel Barlet ([Bar97]) and Ridha Belgrade ([Bel01]) the aim of this article is the study of the existence of (a, b)-hermitian forms on regular (a, b)-modules. We show that every regular (a,b)-module with a non-degenerate bilinear form can be written in an unique way as a direct sum of (a, b)-modules Ei that admit either an (a, b)-hermitian or an (a, b)-anti-hermitian form or both; all three cases are equally possible with explicit examples. As an application we extend the result in [Bel01] on the existence for all (a, b)-modules E associated with the Brieskorn module of a holomorphic function with an isolated singularity, of an (a,b)-bilinear non degenerate form on E. We show that with a small transformation Belgrade's form can be considered (a, b)-hermitian and that the result satis es the axioms of Kyoji Saito's "higher residue pairings".