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Combinatorial Chemistry & High Throughput Screening

Editor-in-Chief

ISSN (Print): 1386-2073
ISSN (Online): 1875-5402

Research Article

Bounds on the Partition Dimension of Convex Polytopes

Author(s): Jia-Bao Liu, Muhammad Faisal Nadeem* and Mohammad Azeem

Volume 25, Issue 3, 2022

Published on: 04 December, 2020

Page: [547 - 553] Pages: 7

DOI: 10.2174/1386207323666201204144422

Price: $65

Abstract

Aims and Objective: The idea of partition and resolving sets play an important role in various areas of engineering, chemistry and computer science such as robot navigation, facility location, pharmaceutical chemistry, combinatorial optimization, networking, and mastermind game.

Methods: In a graph, to obtain the exact location of a required vertex, which is unique from all the vertices, several vertices are selected; this is called resolving set, and its generalization is called resolving partition, where selected vertices are in the form of subsets. A minimum number of partitions of the vertices into sets is called partition dimension.

Results: It was proved that determining the partition dimension of a graph is a nondeterministic polynomial time (NP) problem. In this article, we find the partition dimension of convex polytopes and provide their bounds.

Conclusion: The major contribution of this article is that due to the complexity of computing the exact partition dimension, we provide the bounds and show that all the graphs discussed in the results have partition dimensions either less or equals to 4, but not greater than 4.

Keywords: Partition dimension, resolving partition, resolving sets, convex polytopes, bounded partition dimension.

Graphical Abstract
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