Journal of KIISE:Computer Systems and Theory (한국정보과학회논문지:시스템및이론)

Korean Institute of Information Scientists and Engineers (한국정보과학회)
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Matching Preclusion Problem in Restricted HL-graphs and Recursive Circulant $G(2^m,4)$

제한된 HL-그래프와 재귀원형군 $G(2^m,4)$에서 매칭 배제 문제

  • 박정흠 (가톨릭대학교 컴퓨터정보공학부)
  • Published : 2008.02.15
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Abstract

The matching preclusion set of a graph is a set of edges whose deletion results in a graph that has neither perfect matchings nor almost perfect matchings. The matching preclusion number is the minimum cardinality over all matching preclusion sets. We show in this paper that, for any $m{\geq}4$, the matching preclusion numbers of both m-dimensional restricted HL-graph and recursive circulant $G(2^m,4)$ are equal to degree m of the networks, and that every minimum matching preclusion set is the set of edges incident to a single vertex.

그래프의 매칭 배제 집합은 그것을 삭제한 그래프가 완전 매칭이나 준완전 매칭을 가지지 않는 에지 집합이다. 매칭 배제수는 모든 매칭 배제 집합의 최소 크기이다. 이 논문에서는 임의의 $m{\geq}4$에 대하여 H-차원 제한된 HL-그래프와 재귀원형군 $G(2^m,4)$의 매칭 배제수는 분지수 m과 같고, 모든 최소 매칭 배제 집합은 한 정점에 인접한 에지 집합임을 보인다.

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