Parameter counting for singular monopoles on R^3

TL;DR

This paper calculates the dimension of the moduli space of singular monopoles on R^3 with 't Hooft defects, constructs explicit zero-modes for certain backgrounds, and explores symmetric solutions with physical interpretations.

Contribution

It generalizes existing methods to compute moduli space dimensions for singular monopoles and constructs explicit zero-modes for specific backgrounds.

Findings

Dimension formula for singular monopoles with 't Hooft defects

Explicit basis of L^2-normalizable zero-modes for certain backgrounds

Identification of a family of spherically symmetric singular monopoles

Abstract

We compute the dimension of the moduli space of gauge-inequivalent solutions to the Bogomolny equation on R^3 with prescribed singularities corresponding to the insertion of a finite number of 't Hooft defects. We do this by generalizing the methods of C. Callias and E. Weinberg to the case of R^3 with a finite set of points removed. For a special class of Cartan-valued backgrounds we go further and construct an explicit basis of L^2-normalizable zero-modes. Finally we exhibit and study a two-parameter family of spherically symmetric singular monopoles, using the dimension formula to provide a physical interpretation of these configurations. This paper is the first in a series of three on singular monopoles, where we also explore the role they play in the contexts of intersecting D-brane systems and four-dimensional N=2 super Yang-Mills theories.