约旦曲线参数化的同态索波列夫扩展

Ondrěj Bouchala, Jarmo Jääskeläinen, Pekka Koskela, Haiqing Xu, Xilin Zhou
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引用次数: 0

摘要

乔丹曲线通过单位圆的每个同构参数都会延伸到整个平面的同构。这就提出了一个简化的问题:对于单位圆到平面的同构嵌入,我们什么时候能从单位圆盘找到一个具有相同边界值和可积分一阶分布求导的同构?我们给出了内部乔丹域的最优几何准则,使得乔丹曲线的任何同态参数化都存在一个索波列夫同态扩展。这个问题的部分动机是试图理解哪些边界值可以对应于无穷能量的变形。
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Homeomorphic Sobolev extensions of parametrizations of Jordan curves
Each homeomorphic parametrization of a Jordan curve via the unit circle extends to a homeomorphism of the entire plane. It is a natural question to ask if such a homeomorphism can be chosen so as to have some Sobolev regularity. This prompts the simplified question: for a homeomorphic embedding of the unit circle into the plane, when can we find a homeomorphism from the unit disk that has the same boundary values and integrable first-order distributional derivatives? We give the optimal geometric criterion for the interior Jordan domain so that there exists a Sobolev homeomorphic extension for any homeomorphic parametrization of the Jordan curve. The problem is partially motivated by trying to understand which boundary values can correspond to deformations of finite energy.
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