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Article type: Research Article
Authors: Shanthi, P.a | Amutha, S.b; * | Anbazhagan, N.c | Bragatheeswara Prabu, S.d
Affiliations: [a] Department of Mathematics, Alagappa University, Karaikudi, Tamilnadu, India | [b] Ramanujan Centre for Higher Mathematics (RCHM), Alagappa University, Karaikudi, Tamilnadu, India | [c] Department of Mathematics, Alagappa University, Karaikudi, Tamilnadu, India | [d] Kendriya Vidyalaya, AFS, Avadi, Chennai, Tamilnadu, India
Correspondence: [*] Corresponding author. S. Amutha, Ramanujan Centre for Higher Mathematics (RCHM), Alagappa University, Karaikudi-630 003, Tamilnadu, India. E-mail: amuthas@alagappauniversity.ac.in.
Abstract: A graph G is an undirected finite connected graph. A function f : V (G) → [0, 1] is called a fractional dominating function if, ∑u∈N[v]f (u) ≥1, for all v ∈ V, where N [v] is the closed neighborhood of v. The weight of a fractional dominating function is w (f) = ∑v∈V(G)f (v). The fractional domination number γf (G) has the least weight of all the fractional dominating functions of G. In this paper, we analyze the effects on γf (G) of deleting a vertex from G. Additionally, some bounds on γf (G) are discussed, and provide the exactness of some bounds. If we remove any leaves from any tree T, then the resulting graphs are , where |l| is the number of leaves. Some of the results are proved by the eccentricity value of a vertex e (v).
Keywords: Domination number, edge domination number, fractional domination number, fractional edge domination number AMS Subject Classification: 05C72, 05C69.
DOI: 10.3233/JIFS-222999
Journal: Journal of Intelligent & Fuzzy Systems, vol. 44, no. 5, pp. 7855-7864, 2023
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