Some new generalizations of Domination using restrictions on degrees of vertices

Abstract

A set D of vertices in a graph G=(V,E) is a degree restricted dominating set for G if each vertex vi in D is dominating atmost g(di) vertices of V-D, where g is a function restricting the degree value di with respect to the given function value ki for a natural valued function f from the vertex set of the graph. We define three different types of Degree Restricted Domination by varying the way how the restricted function g(vi) is defined. If g(di)= diki, the corresponding domination is called the ceil degree restricted domination, in short, CDRD, and the dominating set obtained in this manner is the CDRD-set. If g(di)=diki or g(di)=di-ki+1, then the corresponding dominations are respectively called the floor degree restricted domination, in short FDRD, or the translate degree restricted domination, TDRD. The dominating sets obtained in this manner are the FDRD-set and the TDRD-set respectively. In this paper, we introduce these new generalizations of the domination number in line with the different DRD-sets and study these types of domination for some classes of graphs like complete graphs, caterpillar graphs etc. Degree restricted domination has a vital role in retaining the efficiency of nodes in a network and has many interesting applications.