Title of article
Equipartite gregarious 6- and 8-cycle systems Original Research Article
Author/Authors
Elizabeth J. Billington، نويسنده , , Benjamin R. Smith، نويسنده , , D.G. Hoffman، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2007
Pages
9
From page
1659
To page
1667
Abstract
A k-cycle decomposition of a complete multipartite graph is said to be gregarious if each k-cycle in the decomposition has its vertices in k different partite sets. Equipartite gregarious 3-cycle systems are 3-GDDs, and necessary and sufficient conditions for their existence are known (see for instance the CRC Handbook of Combinatorial Designs, 1996, C.J. Colbourn, J.H. Dinitz (Eds.), Section III 1.3). The cases of equipartite and of almost equipartite 4-cycle systems were recently dealt with by Billington and Hoffman. Here, for both 6-cycles and for 8-cycles, we give necessary and sufficient conditions for existence of a gregarious cycle decomposition of the complete equipartite graph image (with n parts, image or image, of size a).
Keywords
Graph decomposition , Complete multipartite graph , Equipartite graph , Gregarious cycle
Journal title
Discrete Mathematics
Serial Year
2007
Journal title
Discrete Mathematics
Record number
947543
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