Hyperbolic Harmonic Mapping for Constrained Brain Surface Registration

Rui Shi, W. Zeng, Zhengyu Su, H. Damasio, Zhonglin Lu, Yalin Wang, S. Yau, X. Gu
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引用次数: 30

Abstract

Automatic computation of surface correspondence via harmonic map is an active research field in computer vision, computer graphics and computational geometry. It may help document and understand physical and biological phenomena and also has broad applications in biometrics, medical imaging and motion capture. Although numerous studies have been devoted to harmonic map research, limited progress has been made to compute a diffeomorphic harmonic map on general topology surfaces with landmark constraints. This work conquer this problem by changing the Riemannian metric on the target surface to a hyperbolic metric, so that the harmonic mapping is guaranteed to be a diffeomorphism under landmark constraints. The computational algorithms are based on the Ricci flow method and the method is general and robust. We apply our algorithm to study constrained human brain surface registration problem. Experimental results demonstrate that, by changing the Riemannian metric, the registrations are always diffeomorphic, and achieve relative high performance when evaluated with some popular cortical surface registration evaluation standards.
约束脑表面配准的双曲调和映射
基于谐波映射的曲面对应自动计算是计算机视觉、计算机图形学和计算几何领域的一个活跃研究领域。它可以帮助记录和理解物理和生物现象,在生物识别、医学成像和运动捕捉方面也有广泛的应用。虽然对调和映射的研究已经有了很多,但是对于一般拓扑曲面上具有里程碑约束的微分纯调和映射的计算却进展有限。本文通过将目标曲面上的黎曼度规转化为双曲度规来解决这一问题,从而保证了调和映射在地标约束下的微分同态。计算算法基于Ricci流法,具有通用性和鲁棒性。将该算法应用于受限人脑表面配准问题的研究。实验结果表明,通过改变黎曼度量,配准始终是微分同态的,并且在常用的皮质表面配准评价标准下取得了较高的性能。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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