Some invariants related to threshold and chain graphs

TL;DR

This paper develops algorithms and formulas to compute various graph invariants such as metric dimension, threshold dimension, and {\

Contribution

It introduces efficient methods and formulas for calculating key invariants of threshold and chain graphs, including metric dimension and {\

Findings

An efficient algorithm for metric dimension of threshold and chain graphs.

Formulas for threshold dimension and {\

An algorithm for {\

Abstract

Let G = (V, E) be a finite simple connected graph. We say a graph G realizes a code of the type 0^s_1 1^t_1 0^s_2 1^t_2 ... 0^s_k1^t_k if and only if G can obtained from the code by some rule. Some classes of graphs such as threshold and chain graphs realizes a code of the above mentioned type. In this paper, we develop some computationally feasible methods to determine some interesting graph theoretical invariants. We present an efficient algorithm to determine the metric dimension of threshold and chain graphs. We compute threshold dimension and restricted threshold dimension of threshold graphs. We discuss L(2, 1)-coloring of threshold and chain graphs. In fact, for every threshold graph G, we establish a formula by which we can obtain the {\lambda}-chromatic number of G. Finally, we provide an algorithm to compute the {\lambda}-chromatic number of chain graphs.