6533b82bfe1ef96bd128d644

RESEARCH PRODUCT

Some families of big and stable bundles on $K3$ surfaces and on their Hilbert schemes of points

Gilberto BiniSamuel BoissièreFlaminio Flamini

subject

Hyperkaehler varietiesGeneral MathematicsK3 surfacesvector bundlesK3 surfaces; Hyperkaehler varieties; vector bundlesSettore MAT/03Mathematics - Algebraic GeometryMathematics::Algebraic Geometrybig vector bundles Mukai-Lazarsfeld vector bundles segre classesFOS: MathematicsSettore MAT/03 - Geometria14J28 14J42 14D20 14C17Mathematics::Symplectic GeometryAlgebraic Geometry (math.AG)

description

Here we investigate meaningful families of vector bundles on a very general polarized $K3$ surface $(X,H)$ and on the corresponding Hyper--Kaehler variety given by the Hilbert scheme of points $X^{[k]}:= {\rm Hilb}^k(X)$, for any integer $k \geqslant 2$. In particular, we prove results concerning bigness and stability of such bundles. First, we give conditions on integers $n$ such that the twist of the tangent bundle of $X$ by the line bundle $nH$ is big and stable on~$X$; we then prove a similar result for a natural twist of the tangent bundle of $X^{[k]}$. Next, we prove global generation, bigness and stability results for tautological bundles on $X^{[k]}$ arising either from line bundles or from Mukai-Lazarsfeld bundles, as well as from Ulrich bundles on $X$, using a careful analysis on Segre classes and numerical computations for $k = 2, 3$.

yearjournalcountryeditionlanguage
2021-09-03
https://dx.doi.org/10.48550/arxiv.2109.01598