Local (Outer) Multiset Dimensions of Graphs
Abstract
Let be a finite, connected, undirected, and simple graph and be a set of vertices in . A representation multiset of a vertex in with respect to is defined as the multiset of distances between and the vertices in . If every two adjacent vertices in have a distinct multiset representation, the set is called a local multiset resolving set of . If has a local multiset resolving set, then this set with the smallest cardinality is called the local multiset basis, and its cardinality is the local multiset dimension of . Otherwise, is said to have an infinite local multiset dimension. On the other hand, if every two adjacent vertices in have a distinct representation multiset, the set is called a local outer multiset resolving set of . Such a set with the smallest cardinality is called the local outer multiset basis, and its cardinality is the local outer multiset dimension of . Unlike the local multiset dimension, every graph has a finite local outer multiset dimension. This paper presents some basic properties of local (outer) multiset dimensions, including lower bounds for the dimensions and a necessary condition for a finite local multiset dimension. We also determine local (outer) multiset dimensions for some graphs of small diameter.
Cite
@article{arxiv.2507.15071,
title = {Local (Outer) Multiset Dimensions of Graphs},
author = {Rinovia Simanjuntak and M. Ali Hasan and Muhung Anggarawan},
journal= {arXiv preprint arXiv:2507.15071},
year = {2025}
}
Comments
15 pages, 1 figure