Curves with decomposable normal vector bundles and automorphism groups
Abstract
If a smooth projective threefold satisfies a certain Property A (see below for definition), then any automorphism of has zero entropy. Let be a smooth projective threefold satisfying Property A. Let be a blowup at either a point or at a smooth curve with the following two properties: i) is an odd number, and ii) the normal vector bundle is decomposable. Then we show that also satisfies Property A. As a further application of Property A we prove the following result. Let be the blowup of at a finite number of points, and let be the blowup of at a finite number of pairwise disjoint smooth curves (here the images of these curves in may intersect). Then any automorphism of has the same first and second dynamical degrees. Under some further conditions, then any automorphism of has zero entropy. The result is also valid for threefolds satisfying a certain condition on the second Chern class. Some explicit examples are given.
Keywords
Cite
@article{arxiv.1410.1733,
title = {Curves with decomposable normal vector bundles and automorphism groups},
author = {Tuyen Trung Truong},
journal= {arXiv preprint arXiv:1410.1733},
year = {2014}
}
Comments
10 pages. Theorem 2 in the previous version is extended in several directions, using the additional condition that $\zeta .c_2(X)\leq 0$