Abstract
AbstractLet X be a K3 surface which doubly covers an Enriques surface S. If $$n\in {\mathbb {N}}$$
n
∈
N
is an odd number, then the Hilbert scheme of n-points $$X^{[n]}$$
X
[
n
]
admits a natural quotient $$S_{[n]}$$
S
[
n
]
. This quotient is an Enriques manifold in the sense of Oguiso and Schröer. In this paper we construct slope stable sheaves on $$S_{[n]}$$
S
[
n
]
and study some of their properties.
Funder
Gottfried Wilhelm Leibniz Universität Hannover
Publisher
Springer Science and Business Media LLC