Non-split Domination Cover Pebbling Number for Some Class of Middle Graphs

Abstract

Let G be a connected graph. A pebbling move is defined as taking two pebbles from one vertex and placing one pebble to an adjacent vertex and throwing away the other pebble. The non-split domination cover pebbling number, ns(G), of a graph G is the minimum of pebbles that must be placed on V(G) such that after a sequence of pebbling moves, the set of vertices with a pebble forms a non-split dominating set of G, regardless of the initial configuration of pebbles. We discuss some basic results, NP-completeness of non-split domination number, and determine ns for some families of Middle graphs.