Theory of loop algebra on multi-loop kinematic chains and its application 被引量：2

Theory of loop algebra on multi-loop kinematic chains and its application

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摘要 Based on the mathematic representation of loops of kinematic chains, this paper proposes the " ⊕ " operation of loops and its basic laws and establishes the basic theorem system of the loop algebra of kinematic chains. Then the basis loop set and its determination conditions, and the ways to obtain the crucial perimeter topological graph are presented. Furthermore, the characteristic perimeter topo-logical graph and the characteristic adjacency matrix are also developed. The most important characteristic of this theory is that for a topological graph which is drawn or labeled in any way, both the resulting characteristic perimeter topological graph and the characteristic adjacency matrix obtained through this theory are unique, and each has one-to-one correspondence with its kinematic chain. This character-istic dramatically simplifies the isomorphism identification and establishes a theoretical basis for the numeralization of topological graphs, and paves the way for numeralization and computerization of the structural synthesis and mechanism design further. Finally, this paper also proposes a concise isomorphism identifica-tion method of kinematic chains based on the concept of characteristic adjacency matrix. Based on the mathematic representation of loops of kinematic chains, this paper proposes the “⊕” operation of loops and its basic laws and establishes the basic theorem system of the loop algebra of kinematic chains. Then the basis loop set and its determination conditions, and the ways to obtain the crucial perimeter topological graph are presented. Furthermore, the characteristic perimeter topological graph and the characteristic adjacency matrix are also developed. The most important characteristic of this theory is that for a topological graph which is drawn or labeled in any way, both the resulting characteristic perimeter topological graph and the characteristic adjacency matrix obtained through this theory are unique, and each has one-to-one correspondence with its kinematic chain. This characteristic dramatically simplifies the isomorphism identification and establishes a theoretical basis for the numeralization of topological graphs, and paves the way for numeralization and computerization of the structural synthesis and mechanism design further. Finally, this paper also proposes a concise isomorphism identification method of kinematic chains based on the concept of characteristic adjacency matrix.

作者 HUANG Zhen DING HuaFeng

机构地区 Robotics Research Center

出处《Science China(Technological Sciences)》 SCIE EI CAS 2007年第4期437-447,共11页 中国科学（技术科学英文版）

基金 Supported by the National Natural Science Foundation of China (Grant No. 50575197)

关键词 KINEMATIC chain loop ALGEBRA PERIMETER topological graph ISOMORPHISM identification kinematic chain loop algebra perimeter topological graph isomorphism identification

分类号 O153 [理学—基础数学]

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参考文献2

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