Some resolving parameters with the minimum size for two specific graphs

TL;DR

This paper investigates the minimum resolving sets for specific graph classes, including m-cylinder graphs, Boolean lattices, and line graphs of certain bipartite graphs, providing computational insights into their resolving parameters.

Contribution

It offers a computational study of resolving, doubly resolving, and strong resolving sets for complex graph structures like m-cylinders and Boolean lattices.

Findings

Determined minimum resolving set sizes for m-cylinder graphs.

Analyzed resolving parameters for Boolean lattices and their subgraphs.

Provided bounds and exact values for resolving sets in line graphs of bipartite graphs.

Abstract

A resolving set for a graph $G$ is a set of vertices $Q = \{q_1, ..., q_k\}$ such that, for all $p\in V(G)$ the $k$-tuple $(d(p, q_1), ..., d(p, q_k ))$ uniquely determines $p$, where $d(p, q_i)$ is considered as the minimum length of a shortest path from $p$ to $q_i$ in graph $G$. In this paper, we consider the computational study of some resolving sets with the minimum size for the $m$-cylinder graph $(C_n\Box P_k)\Box P_m$. The Boolean lattice $BL_n$, $n\geq 1$, is the graph whose vertex set is the set of all subsets of $[n]=\{1,2,...,n\}$, where two subsets $X$ and $Y$ are adjacent if their symmetric difference has precisely one element. In the graph $BL_n$, the layer $L_i$ is the family of $i$-subsets of $[n]$. The subgraph $BL_n(i,i+1)$ is the subgraph of $BL_n$ induced by layers $L_i$ and $L_{i+1}$. Usually the graph $BL_n(1,2)$ is denoted by $H(n)$. We study the minimum size of a resolving set, doubly resolving set and strong resolving set for the graph $L(n)$, which is the line graph of $H(n)$.