Some New Results on the Curling Number of Graphs

Abstract

Let S=S1S2S3… Sn be a finite string. Write S in the form XYY… Y=XYk, consisting of a prefix X (which may be empty), followed by k copies of a non-empty string Y. Then, the greatest value of this integer k is called the curling number of S and is denoted by cn(S). Let the degree sequence of the graph G be written as a string of identity curling subsequences say, Xk11 Xk22 Xk33 … Xkll. The compound curling number of G, denoted cnc(G) is defined to be, cnn(G) = Πli=1ki. In this paper, we discuss the curling number and compound curling number of certain products of graphs.