论文信息 - On the length of longest dominating cycles in graphs

On the length of longest dominating cycles in graphs

Abstract A cycle C in an undirected and simple graph G is dominating if G - C is edgeless. A graph G is called cycle-dominable if G contains a dominating cycle. There exists 1-tough graph in which no longest cycle is dominating. Moreover, the difference of the length of a longest cycle and of a longest dominating cycle in a 1-tough cycle-dominable graph may be made arbitrarily large. Some lower bounds for the length of dominating cycles in cycle-dominable graph are given. These results generalize and strengthen some well-known theorems of Jung and Fraisse (1989) and Bauer and Veldman et al. (1988).

Hoa Vu Dinh

[1] A. Bigalke,et al. Über Hamiltonsche Kreise und unabhängige Ecken in Graphen , 1979 .

[2] Douglas Bauer,et al. A generalization of a result of Häggkvist and Nicoghossian , 1989, J. Comb. Theory, Ser. B.

[3] Edward F. Schmeichel,et al. Long cycles in graphs with large degree sums , 1990, Discret. Math..

[4] Nicos Christofides,et al. Conditions for the existence of Hamiltonian circuits in graphs based on vertex degrees , 1985 .

[5] Vasek Chvátal,et al. Tough graphs and hamiltonian circuits , 1973, Discret. Math..

[6] Vũ đình hòa. Ein Struktursatz für 2‐fach zusammenhängende Graphen mit großer Minimalvalenz , 1986 .

[7] Vu Dinh Hoa. On the Length of Maximal Dominating Cycle in 2-Connected Graphs , 1994, J. Inf. Process. Cybern..