In this note, we solve a minimization problem arising in a recent work of Bolognesi and Tong on the determination of an anti-de Sitter monopole wall. We show that the problem has a unique solution. Although the solution cannot be obtained explicitly, we show that it may practically be constructed via a shooting method for which the correct shooting slope is unique. We also obtain some energy estimates which allow an asymptotic explicit determination of the monopole wall in a large coupling parameter limit.
ASJC Scopus subject areas
- Statistical and Nonlinear Physics
- Mathematical Physics