Local descriptions of the heterotic SU(3) moduli space

Abstract

The heterotic SU(3) system, also known as the Hull--Strominger system, arises from compactifications of heterotic string theory to six dimensions. This paper investigates the local structure of the moduli space of solutions to this system on a compact 6-manifold X, using a vector bundle Q=(T1,0X)* End(E) T1,0X, where E X is the classical gauge bundle arising in the system. We establish that the moduli space has an expected dimension of zero. We achieve this by studying the deformation complex associated to a differential operator D, which emulates a holomorphic structure on Q, and demonstrating an isomorphism between the two cohomology groups which govern the infinitesimal deformations and obstructions in the deformation theory for the system. We also provide a Dolbeault-type theorem linking these cohomology groups to Cech cohomology, a result which might be of independent interest, as well as potentially valuable for future research.