Gauge theory on T*CP2: explicit Sp(2)-instantons, HYM connections, and Spin(7)-instantons

Abstract

We construct and classify SU(3)-invariant primitive Hermitian Yang-Mills connections and Sp(2)-instantons with gauge groups S = S1 and S = SO(3) over the Calabi manifold X = T*CP2, the unique non-flat, complete, cohomogeneity-one hyperkahler 8-manifold. Moreover, in the case of S = S1, we also classify the SU(3)-invariant Spin(7)-instantons over X in the following sense. Letting I, J, K denote the Spin(7)-structures on X induced from the complex structures I, J, K in the hyperkahler triple, we prove that on each invariant S1-bundle Ek X, k ∈ Z, the space of invariant Spin(7)-instantons with respect to L forms a one-parameter family modulo gauge. Moreover, every pair of one-parameter families of I-, J-, and K-Spin(7)-instantons intersects only at the unique invariant Sp(2)-instanton on Ek, which is non-flat when k ≠ 0.