English

Level algebras with bad properties

Commutative Algebra 2008-04-10 v3 Algebraic Geometry

Abstract

This paper can be seen as a continuation of the works contained in the recent preprints [Za], of the second author, and [Mi], of Juan Migliore. Our results are: 1). There exist codimension three artinian level algebras of type two which do not enjoy the Weak Lefschetz Property (WLP). In fact, for e0e\gg 0, we will construct a codimension three, type two hh-vector of socle degree ee such that {\em all} the level algebras with that hh-vector do not have the WLP. We will also describe the family of those algebras and compute its dimension, for each e0e\gg 0. 2). There exist reduced level sets of points in P3{\mathbf P}^3 of type two whose artinian reductions all fail to have the WLP. Indeed, the examples constructed here have the same hh-vectors we mentioned in 1). 3). For any integer r3r\geq 3, there exist non-unimodal monomial artinian level algebras of codimension rr. As an immediate consequence of this result, we obtain another proof of the fact (first shown by Migliore in [Mi], Theorem 4.3) that, for any r3r\geq 3, there exist reduced level sets of points in Pr{\mathbf P}^r whose artinian reductions are non-unimodal.

Keywords

Cite

@article{arxiv.math/0512198,
  title  = {Level algebras with bad properties},
  author = {Mats Boij and Fabrizio Zanello},
  journal= {arXiv preprint arXiv:math/0512198},
  year   = {2008}
}

Comments

10 pages; a few minor changes; to appear in the Proc. of the AMS