The weak Lefschetz property for Artinian graded rings and basic sequences
Commutative Algebra
2011-09-13 v1
Abstract
The basic sequence of a homogeneous ideal defining an Artinian graded ring not having the weak Lefschetz property has the property that the first term of the last part is less than the last term of the penultimate part. For a general linear form in , this fact affects in a certain way the behavior of the square matrices in which represent the multiplications of the elements of by through a minimal free presentation of over . Taking advantage of it, we consider some modules over an algebra generated over by the square matrices mentioned above. In this manner, for the case , we prove that an Artinian \Gor\ graded ring has the weak Lefschetz property if and the number of the minimal generators of over is two.
Keywords
Cite
@article{arxiv.1109.2365,
title = {The weak Lefschetz property for Artinian graded rings and basic sequences},
author = {Mutsumi Amasaki},
journal= {arXiv preprint arXiv:1109.2365},
year = {2011}
}