Geometry and stability of tautological bundles on Hilbert schemes of points

TL;DR

This paper investigates the geometry and slope stability of tautological vector bundles on Hilbert schemes of points on smooth surfaces, extending previous results and revealing new geometric properties.

Contribution

It generalizes the slope stability results of tautological bundles on Hilbert schemes beyond specific cases and explores their geometric structure and relations to vector fields.

Findings

Proves slope stability of tautological bundles in general settings.

Shows every sufficiently positive semistable bundle on a curve arises from a tautological bundle.

Identifies the tautological tangent bundle with the sheaf of vector fields tangent to a divisor.

Abstract

The purpose of this paper is to explore the geometry and establish the slope stability of tautological vector bundles on Hilbert schemes of points on smooth surfaces. By establishing stability in general we complete a series of results of Schlickewei and Wandel who proved the slope stability of these vector bundles for Hilbert schemes of 2 points or 3 points on K3 or abelian surfaces with Picard group restrictions. In exploring the geometry we show that every sufficiently positive semistable vector bundle on a smooth curve arises as the restriction of a tautological vector bundle on the Hilbert scheme of points on the projective plane. Moreover we show the tautological bundle of the tangent bundle is naturally isomorphic to the sheaf of vector fields tangent to the divisor which consists of nonreduced subschemes.