Sobolev Metrics on Spaces of Discrete Regular Curves

Jonathan CerqueiraFlorida State University, Emmanuel HartmanUniversity of Houston, Eric KlassenFlorida State University, Martin BauerFlorida State University
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Abstract

Reparametrization invariant Sobolev metrics on spaces of regular curves have been shown to be of importance in the field of mathematical shape analysis. For practical applications, one usually discretizes the space of smooth curves and considers the induced Riemannian metric on a finite dimensional approximation space. Surprisingly, the theoretical properties of the corresponding finite dimensional Riemannian manifolds have not yet been studied in detail, which is the content of the present article. Our main theorem concerns metric and geodesic completeness and mirrors the results of the infinite dimensional setting as obtained by Bruveris, Michor and Mumford.
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离散正则曲线空间上的索波列夫度量
规则曲线空间上的重构不变 Sobolev 度量已被证明在数学形状分析领域具有重要意义。在实际应用中,人们通常将光滑曲线空间离散化,然后考虑有限维近似空间上的诱导黎曼度量。令人惊讶的是,人们尚未对相应的有限维黎曼流形的理论性质进行详细研究,而这正是本文的研究内容。我们的主要定理涉及度量和大地的完备性,并反映了布鲁维里斯、米乔和芒福德在无限维集上的结果。
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