Linear subspaces, symbolic powers and Nagata type conjectures
Algebraic Geometry
2016-04-12 v2
Abstract
Prompted by results of Guardo, Van Tuyl and the second author for lines in projective 3 space, we develop asymptotic upper bounds for the least degree of a homogeneous form vanishing to order at least m on a union of disjoint r dimensional planes in projective n space for n at least 2r+1. These considerations lead to new conjectures that suggest that the well known conjecture of Nagata for points in the projective plane is not sporadic, but rather a special case of a more general phenomenon.
Cite
@article{arxiv.1207.1159,
title = {Linear subspaces, symbolic powers and Nagata type conjectures},
author = {Marcin Dumnicki and Brian Harbourne and Tomasz Szemberg and Halszka Tutaj-Gasińska},
journal= {arXiv preprint arXiv:1207.1159},
year = {2016}
}
Comments
19 pages; made many minor improvements to exposition; one major improvement: replaced an example with 9 lines in P^4 by a family of examples with (n-1)^{n-2} lines in P^n for n >= 3