Generalized Hilbert Functions

Abstract

Let M be a finite module and let I be an arbitrary ideal over a Noetherian local ring. We define the generalized Hilbert function of I on M using the 0th local cohomology functor. We show that our definition re-conciliates with that of Ciuperc a. By generalizing Singh's formula (which holds in the case of λ(M/IM)<∞), we prove that the generalized Hilbert coefficients j0,..., jd-2 are preserved under a general hyperplane section, where d= dim\,M. We also keep track of the behavior of jd-1. Then we apply these results to study the generalized Hilbert function for ideals that have minimal j-multiplicity or almost minimal j-multiplicity. We provide counterexamples to show that the generalized Hilbert series of ideals having minimal or almost minimal j-multiplicity does not have the `expected' shape described in the case where λ(M/IM)<∞. Finally we give a sufficient condition such that the generalized Hilbert series has the desired shape.