On the Degree of Hilbert Polynomials of Derived Functors


Cite item

Full Text

Open Access Open Access
Restricted Access Access granted
Restricted Access Subscription Access

Abstract

Given a d-dimensional Cohen–Macaulay local ring (R,m), let I be an m-primary ideal, and let J be a minimal reduction ideal of I. If M is a maximal Cohen–Macaulay R-module, then, for n large enough and 1 ≤ id, the lengths of the modules ExtRi(R/J,M/InM) and ToriR(R/J,M/InM) are polynomials of degree d − 1. It is also shown that

\(\deg \beta _i^R(M/{I^n}M) = \deg \mu _R^i(M/{I^n}M) = d - 1,\)
where βiR (·) and μRi (·) are the ith Betti number and the ith Bass number, respectively.

About the authors

H. Saremi

Department of Mathematics, Sanandaj Branch

Author for correspondence.
Email: hero.saremi@gmail.com
Iran, Islamic Republic of, Sanandaj

A. Mafi

Department of Mathematics

Author for correspondence.
Email: A_Mafi@ipm.ir
Iran, Islamic Republic of, Sanandaj

Supplementary files

Supplementary Files
Action
1. JATS XML
Download

Copyright (c) 2019 Pleiades Publishing, Ltd.