Epsilon multiplicity, multiplicity=volume formula and analytic spread of family of ideals

Abstract

In an analytically unramified local ring (R, m) of dimension d≥ 1, for a filtration of ideals I=\Im\m∈ N satisfying A(r) condition and for any m-primary ideal K, it is shown in [18] that the epsilon multiplicity of the weakly graded family of ideals \(Im:K)\m∈ N exists as a limit and it is bounded above by the epsilon multiplicity of I, ε( I). In this article, we first show that ε( I) coincides with the epsilon multiplicity of \(Im:K)\m∈ N and this leads to the following: (a) an expression for ε( I) as a limit of the epsilon multiplicities of other graded families of ideals and (b) a multiplicity=volume formula for the epsilon multiplicity of an ideal I in R. In the final part of the article, we investigate the maximality of the analytic spread of filtrations of ideals.