The spectrum of an operator associated with G2-instantons with 1-dimensional singularities and Hermitian Yang-Mills connections with isolated singularities

Abstract

This is the first step in an attempt at a deformation theory for G2-instantons with 1-dimensional conic singularities. Under a set of model data, the linearization yields a self-adjoint first order elliptic operator P on a certain bundle over S5. As a dimension reduction, the operator P also arises from Hermitian Yang-Mills connections with isolated conic singularities on a Calabi-Yau 3-fold. Using the Quaternion structure in the Sasakian geometry of S5, we describe the set of all eigenvalues of P (denoted by Spec P). We show that SpecP consists of finitely many integers induced by certain sheaf cohomologies on P2, and infinitely many real numbers induced by the spectrum of the rough Laplacian on the pullback endomorphism bundle over S5. The multiplicities and the form of an eigensection can be described fairly explicitly. Using the representation theory of SU(3) and the subgroup S[U(1)× U(2)], we show an example in which SpecP and the multiplicities can be completely determined.