摘要
提出一种基于曲面内蕴度量的等距变换不变量构造方法.通过不变几何基元构造不变核,再对不变核进行多重积分,得到曲面上的等距不变量.这种不变量完全基于曲面的内在属性,有直观的几何解释,并且不受数量约束.实验表明,它对于描述曲面的等距变换,如不同表情的同一人脸、不同姿态的同一人体运动等具有潜在应用意义.
In this paper, a new method to construct isometric invariants for surfaces is proposed based on intrinsic metric. The invariants are obtained by multiple integrals of invariant core, which is constructed by invariant geometric primitives on surfaces, and are fully dependent on the intrinsic properties of surfaces, with intuitive geometric meaning and infinite in number. The experiment results show that they have some potential in describing the isometric transformation of surfaces, such as different facial expressions of the same person, different posture movements of the same person and so on.
出处
《系统科学与数学》
CSCD
北大核心
2009年第9期1178-1188,共11页
Journal of Systems Science and Mathematical Sciences
基金
973国家重点基础研究计划(2004CB318006)
国家自然科学基金项目(60873164
60573154
60533090)资助
关键词
曲面度量
等距变换
不变量
非刚体运动
Surface metric, isometric transformation, invariants, non-rigid motion.