Cohen–Macaulay property and linearity of pinched Veronese rings

Ornella Greco; Ivan Martino

doi:10.1216/jca.2021.13.347

Abstract

In this work, we study the Betti numbers of pinched Veronese rings, by means of the reduced homology of squarefree divisor complexes. We characterize when these rings are Cohen–Macaulay and we study the shape of the Betti tables for the pinched Veronese in the two variables. As a byproduct we obtain information on the linearity of such rings. Moreover, in the last section we compute the canonical modules of the Veronese modules.

Citation

Download Citation

Ornella Greco. Ivan Martino. "Cohen–Macaulay property and linearity of pinched Veronese rings." J. Commut. Algebra 13 (3) 347 - 360, Fall 2021. https://doi.org/10.1216/jca.2021.13.347

Information

Received: 14 February 2018; Revised: 2 January 2019; Accepted: 26 February 2019; Published: Fall 2021

First available in Project Euclid: 18 January 2022

MathSciNet: MR4366826

zbMATH: 1485.13038

Digital Object Identifier: 10.1216/jca.2021.13.347

Subjects:

Primary: 13D02 , 13D40

Secondary: 05E99 , 13A02 , 13C14

Keywords: graded Betti numbers , linearity , pinched Veronese rings , pseudo-linearity

Abstract

Citation

Information

KEYWORDS/PHRASES

PUBLICATION TITLE:

PUBLICATION YEARS