Yang-Mills-Higgs: A Geometric Theory of Binary Labels on Non-Contractible Spaces
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Abstract
We reformulate binary classification on a manifold M as a Yang-Mills-Higgs variational problem.
Labelled data is encoded as a functor from the fundamental groupoid of M to the one-object groupoid B(Z_2), whose monodromy class in H^1(M, Z_2) is a topological obstruction to realising the classifier by a sign function.
The classifier-section and the connection jointly minimise a Yang-Mills-Higgs energy subject to hard data conditions: the matter sector carries the classification content, while the Yang-Mills sector is bounded below in each topological class by the Bogomolny inequality and selects the gauge background.
This recovers the companion paper's harmonic interpolation as the contractible-base, flat-connection reduction.
Two structural payoffs follow.
First, the curvature 2-form of the selected connection has a precise dictionary with transformer attention: it is the antisymmetric part of the attention bilinear, and the abelian/non-abelian split of curvature corresponds to the single-head/multi-head split of attention.
Second, XOR on the torus is solved in closed form by the covariantly harmonic section of the double-Mobius bundle, with minimum energy 2*pi^2 verified numerically to machine precision, whereas an MLP trained on the same data finds a structurally different boundary that ignores the toroidal identifications.
Worked examples run an example ladder (circle, torus, S^2 Dirac monopole, S^4 BPST instanton); a matter-sector proximity-scaling theorem is proved in the two-point case.