用叶理法证明劳森锥是$ A_{\ φ} $-最小化的

Discrete & Continuous Dynamical Systems - S Pub Date : 2021-02-16 DOI:10.3934/DCDS.2021077

Connor Mooney, Yang Yang

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引用次数: 6

摘要

We give a proof by foliation that the cones over \begin{document}$ \mathbb{S}^k \times \mathbb{S}^l $\end{document} minimize parametric elliptic functionals for each \begin{document}$ k, \, l \geq 1 $\end{document}. We also analyze the behavior at infinity of the leaves in the foliations. This analysis motivates conjectures related to the existence and growth rates of nonlinear entire solutions to equations of minimal surface type that arise in the study of such functionals.

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A proof by foliation that lawson's cones are $ A_{\Phi} $-minimizing

We give a proof by foliation that the cones over \begin{document}$ \mathbb{S}^k \times \mathbb{S}^l $\end{document} minimize parametric elliptic functionals for each \begin{document}$ k, \, l \geq 1 $\end{document}. We also analyze the behavior at infinity of the leaves in the foliations. This analysis motivates conjectures related to the existence and growth rates of nonlinear entire solutions to equations of minimal surface type that arise in the study of such functionals.

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