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Autori principali: Nair, Kavya R., Sunitha, M. S.
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2409.14117
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author Nair, Kavya R.
Sunitha, M. S.
author_facet Nair, Kavya R.
Sunitha, M. S.
contents This paper introduces the concept of compliant vertices and compliant graphs, with a focus on the total domination degree (TDD) of a vertex in compliant graphs. The TDD is systematically calculated for various graph classes, including path graphs, cycles, book graphs, windmill graphs, wheel graphs, complete graphs, and complete bipartite graphs. The study explores inequalities involving TDD and defines total domination regular graphs. Furthermore, the TDD is analyzed in several graph operations such as union, join, composition, and corona, with a discussion on the property of the resulting graphs. The paper also examines the subdivision of complete graphs and degree splitting of path graphs. In the subsequent section, the total domination index (TDI) is introduced, and its values are calculated for different graph classes. The study concludes with bounds for the TDI across these graph classes.
format Preprint
id arxiv_https___arxiv_org_abs_2409_14117
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Total Domination Index in Graphs
Nair, Kavya R.
Sunitha, M. S.
Combinatorics
This paper introduces the concept of compliant vertices and compliant graphs, with a focus on the total domination degree (TDD) of a vertex in compliant graphs. The TDD is systematically calculated for various graph classes, including path graphs, cycles, book graphs, windmill graphs, wheel graphs, complete graphs, and complete bipartite graphs. The study explores inequalities involving TDD and defines total domination regular graphs. Furthermore, the TDD is analyzed in several graph operations such as union, join, composition, and corona, with a discussion on the property of the resulting graphs. The paper also examines the subdivision of complete graphs and degree splitting of path graphs. In the subsequent section, the total domination index (TDI) is introduced, and its values are calculated for different graph classes. The study concludes with bounds for the TDI across these graph classes.
title Total Domination Index in Graphs
topic Combinatorics
url https://arxiv.org/abs/2409.14117