Electromagnetism from two matter spaces: mutual helicity and the nondegenerate completion

Abstract

We show that generic Maxwell fields can be represented within the matter-space framework by introducing two independent matter-space flows. In the one-flow formulation the electromagnetic field strength is the pull-back of a two-form on a three-dimensional matter space and therefore satisfies F F=0, so that a single flow captures only a degenerate, helicity-carrying sector. The minimal completion is obtained by writing F=G(1)+G(2), where each sector field G(I) is the pull-back of a matter-space two-form from an independent flow. Each sector is individually degenerate, G(I) G(I)=0, while the full field satisfies F F=2G(1) G(2); the invariant excluded by the one-flow theory is thus recovered as an inter-flow quantity. We interpret this structure in terms of mutual helicity: the total helicity decomposes into two self-helicity contributions and a mutual term whose exterior derivative is F F. Hence a configuration with vanishing mutual helicity lies in the degenerate sector, whereas a nondegenerate Maxwell field necessarily carries a nontrivial mutual helicity. A variational principle for the total field recovers the sourced Maxwell equation, the two matter-space variations combining into the full equation whenever the sector kernels intersect trivially. Generic electromagnetism is thereby reconstructed as the minimal coupled completion of two individually degenerate matter-space sectors.