Decay of excess for the abelian Higgs model
Abstract
In this article we prove that entire critical points (u,∇) of the self-dual U(1)-Yang-Mills-Higgs functional E1, with energy E1(u,∇;BR):=∫BR[|∇ u|2+(1-|u|2)24+|F∇|2]≤(2π+τ(n)) ωn-2Rn-2 for all R>0, have unique blow-down. Moreover, we show that they are two-dimensional in ambient dimension 2≤ n≤4, or in any dimension n2 assuming that (u,∇) is a local minimizer, thus establishing a co-dimension-two analogue of Savin's theorem. The main ingredient is an Allard-type improvement of flatness.
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