On the Curling Number of Certain Graphs

Abstract

In this paper, we introduce the concept of curling subsequence of simple, finite and connected graphs. A curling subsequence is a maximal subsequence C of the degree sequence of a simple connected graph G for which the curling number cn(G) corresponds to the curling number of the degree sequence per se and hence we call it the curling number of the graph G. A maximal degree subsequence with equal entries is called an identity subsequence. The number of identity curling subsequences in a simple connected graph G is denoted ic(G). We show that the curling number conjecture holds for the degree sequence of a simple connected graph G on n ≥ 1 vertices. We also introduce the notion of the compound curling number of a simple connected graph G and then initiate a study on the curling number of certain standard graphs like Jaco graphs and set-graphs.