无穷大时的独特延续：一般翘曲圆柱体上的卡勒曼估计值

Pub Date : 2024-07-04 DOI:10.1093/imrn/rnae147

Nicolò De Ponti, Stefano Pigola, Giona Veronelli

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引用次数: 0

摘要

我们得到了不等式 $|\Delta u| \leq q_{1} 的解的消失结果。|u| + q_{2}|/nabla u|$ 沿黎曼流形的一般翘曲圆柱端衰减为零。在$u$上无限远处的适当衰减条件与势函数$q_{1}$和$q_{2}$的行为以及末端的渐近几何有关。其主要内容是一个新的具有独立意义的卡勒曼估计。此外，还介绍了保角变形和最小图的几何应用。

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Unique Continuation at Infinity: Carleman Estimates on General Warped Cylinders

We obtain a vanishing result for solutions of the inequality $|\Delta u| \leq q_{1} |u| + q_{2} |\nabla u|$ that decay to zero along a very general warped cylindrical end of a Riemannian manifold. The appropriate decay condition at infinity on $u$ is related to the behavior of the potential functions $q_{1}$ and $q_{2}$ and to the asymptotic geometry of the end. The main ingredient is a new Carleman estimate of independent interest. Geometric applications to conformal deformations and to minimal graphs are presented.

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