Geometry and symmetries of Hermitian-Einstein and instanton connection moduli spaces

Abstract

We investigate the geometry of the moduli spaces M*(M2n) of Hermitian-Einstein irreducible connections on a vector bundle E over a K\"ahler with torsion (KT) manifold M2n that admits holomorphic and ∇-covariantly constant vector fields, where ∇ is the connection with skew-symmetric torsion H. We demonstrate that such vector fields induce an action on M*(M2n) that leaves both the metric and complex structure invariant. Moreover, if an additional condition is satisfied, the induced vector fields are covariantly constant with respect to the connection with skew-symmetric torsion D on M*(M2n). We demonstrate that in the presence of such vector fields, the geometry of M*(M2n) can be modelled on that of holomorphic toric principal bundles with base space KT manifolds and give some examples. We also extend our analysis to the moduli spaces M*(M4) of instanton connections on vector bundles over KT, bi-KT (generalised K\"ahler) and hyper-K\"ahler with torsion (HKT) manifolds M4. We find that the geometry of M*(S3× S1) can be modelled on that of principal bundles with fibre S3× S1 over Quaternionic K\"ahler manifolds with torsion (QKT). In addition motivated by applications to AdS/CFT, we explore the (superconformal) symmetry algebras of two-dimensional sigma models with target spaces such moduli spaces.