Mixed multiplicities of arbitrary modules

Abstract

Let (R, m) be a Noetherian local ring. In this work we extend the notion of mixed multiplicities of modules, given in Kleiman-Thorup2 and Kirby-Rees1 (see also Bedregal-Perez), to an arbitrary family E,E1,..., Eq of R-submodules of Rp with E of finite colength. We prove that these mixed multiplicities coincide with the Buchsbaum-Rim multiplicity of some suitable R-module. In particular, we recover the fundamental Rees's mixed multiplicity theorem for modules, which was proved first by Kirby and Rees in Kirby-Rees1 and recently also proved by the authors in Bedregal-Perez. Our work is based on, and extend to this new context, the results on mixed multiplicities of ideals obtained by Vi\et in Viet8 and Manh and Vi\et in Manh-Viet. We also extend to this new setting some of the main results of Trung in Trung and Trung and Verma in Trung-Verma1. As in Kleiman-Thorup2, Kirby-Rees1 and Bedregal-Perez, we actually work in the more general context of standard graded R-algebras.