Harmonic maps into principal bundles and generalized magnetic maps

TL;DR

This paper introduces and characterizes Kaluza-Klein harmonic maps into principal bundles, defining generalized magnetic maps, and provides existence results with explicit examples involving twisted harmonic immersions.

Contribution

It develops a geometric framework for generalized magnetic maps as projections of harmonic maps into principal bundles, including gauge fixing and existence theorems, with explicit constructions.

Findings

Characterization of Kaluza-Klein harmonic maps

Main existence theorem for generalized magnetic maps

Explicit examples involving twisted spherical harmonic immersions

Abstract

We study harmonic mappings from a Riemannian manifold $N$ into a principal $G$-bundle $P$ endowed with a $G$-invariant Riemannian metric (i.e. a Kaluza-Klein metric). These morphisms are called Kaluza-Klein harmonic maps and naturally lead to the notion of generalized magnetic maps for an arbitrary gauge group $G$, which are just their projections onto the base manifold of $P$ and might provide a geometric formulation for the magnetic interaction of extended objects modelled by $N$ under the action of a generalized Lorentz force. We provide a characterization of Kaluza-Klein harmonic maps and show that the space of generalized magnetic maps is a quotient of the space of Kaluza-Klein harmonic maps under an equivalence relation generated by an appropriate gauge group. We establish a necessary condition that they must satisfy, the gauge variation formula and the harmonic gauge fixing equation, also providing a main existence theorem for them. After analyzing how they are influenced by the geometry of the fibers of the principal bundle, we construct several instances of generalized magnetic maps, including two non-trivial one-parameter families of examples based on $\alpha$-twisted spherical harmonic immersions with values in the complex $S^{3}\longrightarrow S^{2}$ and quaternionic $S^{7}\longrightarrow S^{4}$ Hopf fibrations, proving that among them the unique uncharged ones are the standard Clifford torus and the standard spherical harmonic immersion of $ S^3\times S^3$ into $S^7$.