The extended Bogomolny equations on R2 × R+ with real symmetry breaking

Abstract

In this paper, we construct solutions to the extended Bogomolny equations on X = R2 × R+ with certain boundary conditions and asymptotic conditions. Let y be the coordinate of R+. Roughly, both the boundary condition and the asymptotic condition say that a solution approaches to a certain model solution when y → 0 and y → ∞ resepctively. The boundary condition (y → 0) is called generalized Nahm pole boundary condition and the asymptotic condition (y → ∞) is called real symmetry breaking condition. The solutions should be thought as an analog of the instanton solutions that Taubes and Dimakis have created (using different methods), while their solutions satisfy a different asymptotic condition.