Deformations of Asymptotically Conical G2-Instantons

Abstract

We develop the deformation theory of instantons on asymptotically conical G2-manifolds, where an asymptotic connection at infinity is fixed. A spinorial approach is adopted to relate the space of deformations to the kernel of a twisted Dirac operator on the G2-manifold and to the eigenvalues of a twisted Dirac operator on the nearly K\"ahler link. This framework is then used to calculate the virtual dimension of the moduli spaces of G2-instantons on which several known examples live. One such example considered is the G2-instanton of G\"unaydin-Nicolai, which lives on R7. As an application of the deformation theory, we show how knowledge of the virtual dimension of the moduli space allows us to prove that unobstructed connections in the moduli space are G2-invariant. By classifying such connections we prove a uniqueness result for unobstructed G2-instantons on the principal G2-bundle over R7.