Convergence of the self-dual abelian Higgs gradient flow
Abstract
Given an initial data configuration (Ain, φin) on R2 such that the self-dual abelian Higgs energy is near the minimum energy within its topological class, we prove that its evolution under the self-dual abelian Higgs gradient flow in temporal gauge converges exponentially as t ∞ with respect to the (H1 × L2)-metric to a minimiser of the energy. Furthermore, we show that the convergence of the scalar field φ may be upgraded to the H1-metric provided the additional assumption on the potential that Ain ∈ Lp ( R2) for 2 < p < ∞. As a corollary, we obtain a quantitative stability for the self-dual abelian Higgs energy which improves upon the previous result of Halavati (arXiv:2310.04866) and partially resolves the open problem posed in his article.
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