Qregularity and tensor products of vector bundles on smooth quadric hypersurfaces
arXiv:0902.2893
Abstract
Let $\Q_n \subset \mathbb P^{n+1}$ be a smooth quadric hypersurface. Here we prove that the tensor product of an $m$-Qregular sheaf on $\Q_n$ and an $l$-Qregular vector bundle on $\Q_n$ is $(m+l)$-Qregular.
4 pages, no figures