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Radiatic dimension of a graph

Publication Type : Journal Article

Publisher : sciencepress ltd

Source : Journal of computations and modelling, sciencepress ltd, Volume 2, Issue 4, Number 4, p.109–131 (2012)

Url : http://www.scienpress.com/Upload/JCM/Vol%202_4_6.pdf

Campus : Bengaluru

School : School of Engineering

Department : Mathematics

Verified : Yes

Year : 2012

Abstract : Let G(V, E) be a simple, finite, connected graph. An injective mapping f : V (G) → Z + such that for every two distinct vertices u, v ∈ V (G), |f(u) − f(v)| ≥ diam(G) + 1 − d(u, v) is called a radio labeling of G. The radio number of f, denoted by rn(f) is the maximum number assigned to any vertex of G. The radio number of G, is the minimum value of rn(f) taken over all radio labelings f of G. A graph G on n vertices is radio graceful if and only if rn(G) = n. In this paper, we define the radiatic dimension of G to be the smallestpositive integer k, such that the sequence of injective functions fi: V (G) → {1, 2, 3, . . . , n}, 1 ≤ i ≤ k, satisfy the condition that for every two distinct vertices u, v ∈ V (G), |fi(u)−fi(v)| ≥ diam(G)+ 1−d(u, v) for some i and denote it by rd(G). Hence a graph is radio graceful if and only if rd(G) = 1. In this paper we study the radiatic dimension of some standard g

Cite this Research Publication : Dr. K. N. Meera and Sooryanarayana, B., “Radiatic dimension of a graph”, Journal of computations and modelling, vol. 2, no. 4, pp. 109–131, 2012.


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