Stable sheaves on bielliptic surfaces: from the classical to the modern

TL;DR

This paper classifies stable sheaves on bielliptic surfaces using classical and modern derived category techniques, establishing the existence of moduli spaces and their birational relationships under Bridgeland stability.

Contribution

It provides the first classification of Chern characters of stable sheaves on bielliptic surfaces and links Bridgeland wall-crossing to birational geometry of moduli spaces.

Findings

Existence of projective coarse moduli spaces for Bridgeland semistable objects.

Birational equivalence of moduli spaces under different stability conditions.

Classification of stable sheaves with Chern characters of specific 'shapes'.

Abstract

Bielliptic surfaces are the last family of Kodaira dimension zero algebraic surfaces without a classification result for the Chern characters of stable sheaves. We rectify this and prove such a classification using a combination of classical techniques, on the one hand, and derived category and Bridgeland stability techniques, on the other. Along the way, we prove the existence of projective coarse moduli spaces of objects in the derived category of a bielliptic surface that Bridgeland semistable with respect to a generic stability condition. By systematically studying the connection between Bridgeland wall-crossing and birational geometry, we show that for any two generic stability conditions $\tau,\sigma$, the two moduli spaces $M_\tau(\mathbf{v})$ and $M_\sigma(\mathbf{v})$ of objects of Chern character $\mathbf{v}$ that are semistable with respect to $\tau$ (resp. $\sigma$) are birational. As a consequence, we show that for primitive $\mathbf{v}$, the moduli space of stable sheaves of class $\mathbf{v}$ is birational to a moduli space of stable sheaves whose Chern character has one of finitely many easily understood "shapes".