Nonabelian Yang-Mills-Higgs and Plateau's problem in codimension three

Abstract

We investigate the asymptotic behavior of the SU(2)-Yang-Mills-Higgs energy E(,A)=∫M|dA|2+|FA|2 in the large mass limit, proving convergence to the codimension-three area functional in the sense of De Giorgi's -convergence. More precisely, for a compact manifold with boundary M and any family of pairs m∈0(M;su(2)) and Am∈ 1(M;su(2)) indexed by a mass parameter m∞, satisfying E(m,Am)≤ Cmm∞1m∫M(m-|m|)2=0, we prove that the (n-3)-currents dual to 12π mtr(dAmm FAm) converge subsequentially to a relative integral (n-3)-cycle T of mass equation M(T)≤ m∞14π mE(m,Am), equation and show conversely that any integral (n-3)-current T with [T]=0∈ Hn-3(M,∂ M;Z) admits such an approximation, with equality in the above inequality. In the special case of pairs (m,Am) satisfying the generalized monopole equation *dAmm=FAm for a calibration form ∈ n-3(M), we deduce that the limit =m∞12π m|dAmm|2 of the Dirichlet energy measures satisfies ≤ |T|, with equality if and only if T is calibrated by , giving evidence for predictions of Donaldson-Segal in the settings of G2-manifolds and Calabi-Yau 3-folds.

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