Finitely generated saturated multi-Rees algebras
Abstract
We study the question of finite generation of saturated multi-Rees algebras and investigate the asymptotic behaviour of related length functions. In the setup of excellent local domains, we show that the saturated multi-Rees algebra of a finite collection of ideals is finitely generated when the analytic spread is not maximal and the associated length function eventually agrees with a polynomial. Similar results are obtained when we restrict to two-dimensional local UFDs with no restrictions on the analytic spread. We further prove that the saturated multi-Rees algebra of finitely many monomial ideals in a polynomial ring modulo an irreducible monomial ideal, is always finitely generated. In this case, the corresponding length function is shown to exhibit piecewise quasi-polynomial behaviour. We also produce multi-ideal versions of a theorem of Amao.
Cite
@article{arxiv.2112.14587,
title = {Finitely generated saturated multi-Rees algebras},
author = {Suprajo Das and Sudeshna Roy},
journal= {arXiv preprint arXiv:2112.14587},
year = {2024}
}
Comments
Final version (major changes), 18 pages, 1 figure