Giacomo Canevari, Federico Luigi Dipasquale, Giandomenico Orlandi
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引用次数: 0
摘要
我们考虑在维数为 n ≥ 3 {n\geq 3} 的封闭黎曼流形上的赫米线束上的轨距不变金兹堡-朗道函数(也称为阿贝尔杨-米尔斯-希格斯模型)。假定耦合参数有对数能量约束,我们研究伦敦极限临界点的渐近行为。在方便地选择了量规之后,我们证明了有限能量临界点在索波列夫规范中的紧凑性。此外,得益于一个合适的单调性公式,我们证明了临界点的能量密度经耦合参数的对数重估后,会收敛到一个静止的、可整流的、标度为 2 的变折点的权重度量。
The Yang–Mills–Higgs functional on complex line bundles: Asymptotics for critical points
We consider a gauge-invariant Ginzburg–Landau functional (also known as Abelian Yang–Mills–Higgs model), on Hermitian line bundles over closed Riemannian manifolds of dimension n≥3{n\geq 3}. Assuming a logarithmic energy bound in the coupling parameter, we study the asymptotic behaviour of critical points in the London limit. After a convenient choice of the gauge, we show compactness of finite-energy critical points in Sobolev norms. Moreover, thanks to a suitable monotonicity formula, we prove that the energy densities of critical points, rescaled by the logarithm of the coupling parameter, converge to the weight measure of a stationary, rectifiable varifold of codimension 2.
期刊介绍:
Advances in Calculus of Variations publishes high quality original research focusing on that part of calculus of variation and related applications which combines tools and methods from partial differential equations with geometrical techniques.
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