Domination and total domination in cubic graphs of large girth.

Abstract: The domination number and the total domination number of a graph without an isolated vertex are among the most well-studied parameters in graph theory. While the inequality is an almost immediate consequence of the definition, the extremal graphs for this inequality are not well understood. Furthermore, even very strong additional assumptions do not allow us to improve the inequality by much. In the present paper we consider the relation of and for cubic graphs of large girth. Clearly, in this case is at least where is the order of . If is close to , then this forces a certain structure within . We exploit this structure and prove an upper bound on , which depends on the value of . As a consequence, we can considerably improve the inequality for cubic graphs of large girth. [Copyright &y& Elsevier]