Conformal Spherical Parametrization for High Genus Surfaces

IF 0.6 Q4 COMPUTER SCIENCE, INFORMATION SYSTEMS Communications in Information and Systems Pub Date : 2007-01-01 DOI:10.4310/CIS.2007.V7.N3.A4
X. Gu, Xin Li, S. Yau, W. Zeng
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引用次数: 10

Abstract

Surface parameterization establishes bijective maps from a surface onto a topologically equivalent standard domain. It is well known that the spherical parameterization is limited to genus-zero surfaces. In this work, we design a new parameter domain, two-layered sphere, and present a framework for mapping high genus surfaces onto sphere. This setup allows us to transfer the existing applications based on general spherical parameterization to the field of high genus surfaces, such as remeshing, consistent parameterization, shape analysis, and so on. Our method is based on Riemann surface theory. We construct meromorphic functions on surfaces: for genus one surfaces, we apply Weierstrass P-functions; for high genus surfaces, we compute the quotient between two holomorphic one-forms. Our method of spherical parameterization is theoretically sound and practically efficient. It makes the subsequent applications on high genus surfaces very promising.
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高格曲面的保形球面参数化
曲面参数化建立了从曲面到拓扑等效标准域的双射映射。众所周知,球面参数化仅限于零属曲面。在本文中,我们设计了一个新的参数域——双层球,并提出了一个高格曲面映射到球上的框架。这种设置允许我们将基于一般球面参数化的现有应用程序转移到高属曲面领域,例如重新网格化,一致参数化,形状分析等。我们的方法是基于黎曼曲面理论。我们在曲面上构造亚纯函数:对于1属曲面,我们应用Weierstrass p函数;对于高属曲面,我们计算了两个全纯一形之间的商。我们的球面参数化方法在理论上是合理的,在实践中是有效的。这使得后续在高属表面上的应用非常有前景。
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来源期刊
Communications in Information and Systems
Communications in Information and Systems COMPUTER SCIENCE, INFORMATION SYSTEMS-
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