Rigid HYM Connections on Tautological Bundles over ALE Crepant Resolutions in Dimension Three

Abstract

For G a finite subgroup of SL(3, C) acting freely on C3 \0\ a crepant resolution of the Calabi-Yau orbifold C3\!/G always exists and has the geometry of an ALE non-compact manifold. We show that the tautological bundles on these crepant resolutions admit rigid Hermitian-Yang-Mills connections. For this we use analytical information extracted from the derived category McKay correspondence of Bridgeland, King, and Reid [J. Amer. Math. Soc. 14 (2001), 535-554]. As a consequence we rederive multiplicative cohomological identities on the crepant resolution using the Atiyah-Patodi-Singer index theorem. These results are dimension three analogues of Kronheimer and Nakajima's results [Math. Ann. 288 (1990), 263-307] in dimension two.