In this paper we present results on changing and unchanging of the domination number with respect to the nondegenerate property P, denoted by γP (G), when a graph G is modified by deleting a vertex or deleting edges. A graph G is (γP (G), k)P -critical if γP (G − S) < γP (G) for any set S ( V (G) with |S| = k. Properties of (γP , k)P -critical graphs are studied. The plus bondage number with respect to the property P, denoted b + P (G), is the cardinality of the smallest set of edges U ⊆ E(G) such that γP (G − U) > γP (G). Some known results for ordinary domination and bondage numbers are extended to γP (G) and b + P (G). Conjectures concerning b + P (G) are posed.
For a graph property $\mathcal {P}$ and a graph $G$, we define the domination subdivision number with respect to the property $\mathcal {P}$ to be the minimum number of edges that must be subdivided (where each edge in $G$ can be subdivided at most once) in order to change the domination number with respect to the property $\mathcal {P}$. In this paper we obtain upper bounds in terms of maximum degree and orientable/non-orientable genus for the domination subdivision number with respect to an induced-hereditary property, total domination subdivision number, bondage number with respect to an induced-hereditary property, and Roman bondage number of a graph on topological surfaces.