## Abstract

We construct an asymptotic metric on the moduli space of two centred hyperbolic monopoles by working in the point particle approximation, that is treating well-separated monopoles as point particles with an electric, magnetic and scalar charge and re-interpreting the dynamics of the 2-particle system as geodesic motion with respect to some metric. The corresponding analysis in the Euclidean case famously yields the negative mass Taub-NUT metric, which asymptotically approximates the L^{2} metric on the moduli space of two Euclidean monopoles, the Atiyah–Hitchin metric. An important difference with the Euclidean case is that, due to the absence of Galilean symmetry, in the hyperbolic case it is not possible to factor out the centre of mass motion. Nevertheless we show that we can consistently restrict to a 3-dimensional configuration space by considering antipodal configurations. In complete parallel with the Euclidean case, the metric that we obtain is then the hyperbolic analogue of negative mass Taub-NUT. We also show how the metric obtained is related to the asymptotic form of a hyperbolic analogue of the Atiyah–Hitchin metric constructed by Hitchin.

Original language | English |
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Article number | 043 |

Number of pages | 15 |

Journal | Symmetry, Integrability and Geometry: Methods and Applications (SIGMA) |

Volume | 19 |

Early online date | 4 Jul 2023 |

DOIs | |

Publication status | Published - 31 Dec 2023 |

### Bibliographical note

Funding Information:GF thanks the Simons Foundation for its support under the Simons Collaboration on Special Holonomy in Geometry, Analysis and Physics [grant number 488631]. CR thanks Michael Singer for useful discussions about the notion of centring for hyperbolic monopoles. The work of CR was supported by the Engineering and Physical Sciences Research Council [grant number EP/V047698/1].

## Keywords

- hyperbolic monopoles
- moduli space metrics

## ASJC Scopus subject areas

- Analysis
- Mathematical Physics
- Geometry and Topology