English

Regulating Hartshorne's connectedness theorem

Algebraic Geometry 2017-02-10 v3 Commutative Algebra Combinatorics

Abstract

A classical theorem by Hartshorne states that the dual graph of any arithmetically Cohen--Macaulay projective scheme is connected. We give a quantitative version of Hartshorne's result, in terms of Castelnuovo--Mumford regularity. If XPnX \subset \mathbb{P}^n is an arithmetically Gorenstein projective scheme of regularity r+1r+1, and if every irreducible component of XX has regularity r\le r', we show that the dual graph of XX is r+r1r\lfloor{\frac{r+r'-1}{r'}}\rfloor-connected. The bound is sharp. We also provide a strong converse to Hartshorne's result: Every connected graph is the dual graph of a suitable arithmetically Cohen-Macaulay projective curve of regularity 3\le 3, whose components are all rational normal curves. The regularity bound is smallest possible in general. Further consequences of our work are: (1) Any graph is the Hochster-Huneke graph of a complete equidimensional local ring. (This answers a question by Sather-Wagstaff and Spiroff.) (2) The regularity of a curve is not larger than the sum of the regularities of its primary components.

Keywords

Cite

@article{arxiv.1506.06277,
  title  = {Regulating Hartshorne's connectedness theorem},
  author = {Bruno Benedetti and Barbara Bolognese and Matteo Varbaro},
  journal= {arXiv preprint arXiv:1506.06277},
  year   = {2017}
}

Comments

Added Remark 1.1 and Example 4.3; improved exposition

R2 v1 2026-06-22T09:57:19.351Z