论文信息 - Symmetric 1-factorizations of the complete graph

Symmetric 1-factorizations of the complete graph

Let S"2"n be the symmetric group of degree 2n. We give a strong indication to prove the existence of a 1-factorization of the complete graph on (2n)! vertices admitting S"2"n as an automorphism group acting sharply transitively on the vertices. In particular we solve the problem when the symmetric group acts on 2p elements, for any prime p. This provides the first class of G-regular 1-factorizations of the complete graph where G is a non-soluble group.

Anita Pasotti | Marco Antonio Pellegrini

[1] W. D. Wallis,et al. On one-factorizations of complete graphs , 1973, Journal of the Australian Mathematical Society.

[2] P. Cameron. Parallelisms Of Complete Designs , 1976 .

[3] M. Reiss,et al. Ueber eine Steinersche combinatorische Aufgabe, welche im 45sten Bande dieses Journals, Seite 181, gestellt worden ist. , 1859 .

[4] Gábor Korchmáros,et al. Sharply transitive 1‐factorizations of the complete graph with an invariant 1‐factor , 1994 .

[5] Alan Hartman,et al. Cyclic One-Factorization of the Complete Graph , 1985, Eur. J. Comb..

[6] Gloria Rinaldi,et al. Quaternionic Starters , 2005, Graphs Comb..

[7] Domenico Labbate,et al. One‐factorizations of complete graphs with vertex‐regular automorphism groups , 2002 .

[8] Gloria Rinaldi,et al. Nilpotent 1‐factorizations of the complete graph , 2005 .

[9] Alexander Rosa,et al. One-factorizations of the complete graph - A survey , 1985, J. Graph Theory.

[10] C. Colbourn,et al. Handbook of Combinatorial Designs , 2006 .

[11] Marco Buratti,et al. Abelian 1-Factorizations of the Complete Graph , 2001, Eur. J. Comb..

[12] Simona Bonvicini,et al. Frattini-based starters in 2-groups , 2008, Discret. Math..

[13] Lars Døvling Andersen. Factorizations of Graphs , 2006 .

[14] Simona Bonvicini,et al. Starters: Doubling Constructions , 2006 .

[15] Douglas R Stinson,et al. Contemporary design theory : a collection of surveys , 1992 .