Gauge freedom in magnetostatics and the effect on helicity in toroidal volumes

TL;DR

This paper explores how gauge choices influence magnetic helicity calculations in magnetostatics within toroidal volumes, using homological methods to provide coordinate-free insights and minimal gauge constructions.

Contribution

It introduces a homological approach to gauge freedom in magnetostatics, deriving classical results without coordinate assumptions and constructing a minimal gauge for helicity comparison.

Findings

Homological methods recover classical magnetostatics results.

A formal proof of relative helicity formulae is provided.

A minimal gauge construction is developed for toroidal volumes.

Abstract

Magnetostatics defines a class of boundary value problems in which the topology of the domain plays a subtle role. For example, representability of a divergence-free field as the curl of a vector potential comes about because of homological considerations. With this in mind, we study gauge-freedom in magnetostatics and its effect on the comparison between magnetic configurations through key quantities such as the magnetic helicity. For this, we apply the Hodge decomposition of $k$-forms on compact orientable Riemaniann manifolds with smooth boundary, as well as de Rham cohomology, to the representation of magnetic fields through potential $1$-forms in toroidal volumes. An advantage of the homological approach is the recovery of classical results without explicit coordinates and assumptions about the fields on the exterior of the domain. In particular, a detailed construction of a minimal gauge and a formal proof of relative helicity formulae are presented.