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Many-to-Many Disjoint Path Covers in the Presence of Faulty Elements
A many-to-many k-disjoint path cover (k-DPC) of a graph G is a set of k disjoint paths joining k sources and k sinks in which each vertex of G is covered by a path. It is called a paired many-to-many disjoint path cover when each source should be joined to a specific sink, and it is called an unpair...
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Published in: | IEEE transactions on computers 2009-04, Vol.58 (4), p.528-540 |
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Main Authors: | , , |
Format: | Article |
Language: | English |
Subjects: | |
Citations: | Items that this one cites Items that cite this one |
Online Access: | Get full text |
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Summary: | A many-to-many k-disjoint path cover (k-DPC) of a graph G is a set of k disjoint paths joining k sources and k sinks in which each vertex of G is covered by a path. It is called a paired many-to-many disjoint path cover when each source should be joined to a specific sink, and it is called an unpaired many-to-many disjoint path cover when each source can be joined to an arbitrary sink. In this paper, we discuss about paired and unpaired many-to-many disjoint path covers including their relationships, application to strong Hamiltonicity, and necessary conditions. And then, we give a construction scheme for paired many-to-many disjoint path covers in the graph H 0 oplus H 1 obtained from connecting two graphs H 0 and H 1 with |V(H 0 )| = |V(H 1 )| by |V(H 1 )| pairwise nonadjacent edges joining vertices in H 0 and vertices in H 1 , where H 0 = G 0 oplus G 1 and H 1 = G 2 oplus G 3 for some graphs G j . Using the construction, we show that every m-dimensional restricted HL-graph and recursive circulant G(2 m , 4) with f or less faulty elements have a paired k-DPC for any f and k ges 2 with f + 2k les m. |
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ISSN: | 0018-9340 1557-9956 |
DOI: | 10.1109/TC.2008.160 |