Stable solutions of U(1) Yang-Mills-Higgs model in R4
Abstract
We give a positive answer to the conjecture of Liu-Ma-Wei-Wu in LMWW that the family of entire solutions to the U(1)-Yang-Mills-Higgs equation constructed by the gluing method in that paper are stable. This is the first family of examples of nontrivial stable critical points to the U(1)-Yang-Mills-Higgs model in higher dimensional Euclidean space. Intuitively, the stability of these solutions corresponds to the fact that holomorphic curves are area-minimizing. We also show that these entire solutions are non-degenerate. Our proof is based on detailed analysis of the linearized operators around this family and the spectrum estimates of the Jacobi operator by Arezzo-Pacard ArePac.
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