arXiv:math/0310376 Abstract

arXiv:math/0310376 [math.AG]Abstract References Reviews Resources

Monomial invariants in codimension two

Published 2003-10-23Version 1

We define the monomial invariants of a projective variety $Z$; they are invariants coming from the generic initial ideal of $Z$. Using this notion, we generalize a result of Cook: If $Z$ is an integral variety of codimension two, satisfying the additional hypothesis $s_Z=s_\Gamma,$ then its monomial invariants are connected.

Comments: LaTeX, 8 pages

Categories: math.AG, math.AC

Subjects: 14M07

Keywords: monomial invariants, codimension, generic initial ideal, integral variety, additional hypothesis

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