论文信息 - The Doyen-Wilson theorem for 3-sun systems

The Doyen-Wilson theorem for 3-sun systems

A solution to the existence problem of G-designs with given subdesigns is known when G is a triangle with p=0,1, or 2 disjoint pendent edges: for p=0, it is due to Doyen and Wilson, the first to pose such a problem for Steiner triple systems; for p=1 and p=2, the corresponding designs are kite systems and bull designs, respectively. Here, a complete solution to the problem is given in the remaining case where G is a 3-sun, i.e. a graph on six vertices consisting of a triangle with three pendent edges which form a 1-factor.

Giovanni Lo Faro | Antoinette Tripodi

[1] Hung-Lin Fu,et al. Two Doyen-Wilson theorems for maximum packings with triples , 1998, Discret. Math..

[2] Wen-Chung Huang,et al. The Doyen-Wilson theorem for bull designs , 2013, Discret. Math..

[3] Giovanni Lo Faro,et al. Embeddings of λ-fold kite systems, λ ≥ 2 , 2006, Australas. J Comb..

[4] Giovanni Lo Faro,et al. The Doyen-Wilson theorem for kite systems , 2006, Discret. Math..

[5] Christopher A. Rodger,et al. On the doyen‐wilson theorem for m‐cycle systems , 1994 .

[6] Richard M. Wilson,et al. Embeddings of Steiner triple systems , 1973, Discret. Math..

[7] Hung-Lin Fu,et al. The Doyen-Wilson theorem for maximum packings of Kn with 4-cycles , 1998, Discret. Math..

[8] Rose Peltesohn. Eine Lösung der beiden Heffterschen Differenzenprobleme , 1939 .

[9] Christopher A. Rodger,et al. The Doyen-Wilson Theorem Extended to 5-Cycles , 1994, J. Comb. Theory, Ser. A.

[10] Jinhua Wang. Perfect dexagon triple systems with given subsystems , 2009, Discret. Math..

[11] Jinhua Wang,et al. Doyen-Wilson theorem for perfect hexagon triple systems , 2011, Discret. Math..

[12] Wen-Chung Huang,et al. The Doyen-Wilson Theorem for Extended Directed Triple Systems , 2007, Ars Comb..