A note On the existence of solutions to Hitchin's self-duality equations

Abstract

In 1987, Hitchin introduced the self-duality equations on rank-2 complex vector bundles over compact Riemann surfaces with genus greater than one as a reduction of the Yang-Mills equation and established the existence of solutions to these equations starting from a Higgs stable bundle. In this paper, we fill in some technical details in Hitchin's original proof by the following three steps. First, we reduce the existence of a solution of class L12 to minimizing the energy functional within a Higgs stable orbit of the L22 complex gauge group action. Second, using this transformation, we obtain a solution of class L12 in this orbit. These two steps primarily follow Hitchin's original approach. Finally, using the Coulomb gauge, we construct a smooth solution by applying an L22 unitary gauge transformation to the L12 solution constructed previously. This last step provides additional technical details to Hitchin's original proof.