论文信息 - Covering graphs with matchings of fixed size

Covering graphs with matchings of fixed size

Let m be a positive integer and let G be a graph. We consider the question: can the edge set E(G) of G be expressed as the union of a set M of matchings of G each of which has size exactly m? If this happens, we say that G is [m]-coverable and we call M an [m]-covering of G. It is interesting to consider minimum[m]-coverings, i.e. [m]-coverings containing as few matchings as possible. Such [m]-coverings will be called excessive[m]-factorizations. The number of matchings in an excessive [m]-factorization is a graph parameter which will be called the excessive[m]-index and denoted by @g"["m"]^'. In this paper we begin the study of this new parameter as well as of a number of other related graph parameters.

Hung-Lin Fu | David Cariolaro

[1] Hung-Lin Fu,et al. Excessive near 1-factorizations , 2009, Discret. Math..

[2] D. de Werra. Equitable colorations of graphs , 1971 .

[3] J. Edmonds. Paths, Trees, and Flowers , 1965, Canadian Journal of Mathematics.

[4] David Cariolaro,et al. Excessive Factorizations of Regular Graphs , 2006 .

[5] C. McDiarmid,et al. The Solution of a Timetabling Problem , 1972 .

[6] Ian Holyer,et al. The NP-Completeness of Edge-Coloring , 1981, SIAM J. Comput..

[7] Jean Fonlupt,et al. Graph theory in Paris : proceedings of a conference in memory of Claude Berge , 2007 .

[8] Park M. Reilly,et al. A Stochastic Simulation Model of A Chemical Plant , 1971 .

[9] D. R. Fulkerson,et al. EDGE COLORINGS IN BIPARTITE GRAPHES , 1966 .

[10] Hung-Lin Fu,et al. On minimum sets of 1-factors covering a complete multipartite graph , 2008, J. Graph Theory.