Higher rank stable pairs on K3 surfaces

Abstract

We define and compute higher rank analogs of Pandharipande-Thomas stable pair invariants in primitive classes for K3 surfaces. Higher rank stable pair invariants for Calabi-Yau threefolds have been defined by Sheshmani shesh1,shesh2 using moduli of pairs of the form n∫o for purely one-dimensional and computed via wall-crossing techniques. These invariants may be thought of as virtually counting embedded curves decorated with a (n-1)-dimensional linear system. We treat invariants counting pairs n∫o on a 3 surface for an arbitrary stable sheaf of a fixed numerical type ("coherent systems" in the language of KY) whose first Chern class is primitive, and fully compute them geometrically. The ordinary stable pair theory of 3 surfaces is treated by MPT; there they prove the KKV conjecture in primitive classes by showing the resulting partition functions are governed by quasimodular forms. We prove a "higher" KKV conjecture by showing that our higher rank partition functions are modular forms.