On threefolds without nonconstant regular functions
摘要
We consider smooth threefolds defined over with for all , . Let be a smooth projective threefold containing and be the boundary divisor with support . We are interested in the following question: What geometry information of can be obtained from the regular function information on ? Suppose that the boundary is a smooth projective surface. In this paper, we analyse two different cases, i.e., there are no nonconstant regular functions on or there are lots of regular functions on . More precisely, if , we prove that . In particular, if the line bundle is not torsion, then , , and is not nef. If there is a positive constant such that for all sufficiently large (we say that is big or the -dimension of is 3) and has no exceptional curves, then is base point free for . Therefore is affine if is big.
引用
@article{arxiv.math/0610883,
title = {On threefolds without nonconstant regular functions},
author = {Jing Zhang},
journal= {arXiv preprint arXiv:math/0610883},
year = {2007}
}
备注
15 pages