Open Mathematics (Dec 2017)

Deficiency of forests

  • Javed Sana,
  • Hussain Mujtaba,
  • Riasat Ayesha,
  • Kanwal Salma,
  • Imtiaz Mariam,
  • Ahmad M. O.

DOI
https://doi.org/10.1515/math-2017-0122
Journal volume & issue
Vol. 15, no. 1
pp. 1431 – 1439

Abstract

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An edge-magic total labeling of an (n,m)-graph G = (V,E) is a one to one map λ from V(G) ∪ E(G) onto the integers {1,2,…,n + m} with the property that there exists an integer constant c such that λ(x) + λ(y) + λ(xy) = c for any xy ∈ E(G). It is called super edge-magic total labeling if λ (V(G)) = {1,2,…,n}. Furthermore, if G has no super edge-magic total labeling, then the minimum number of vertices added to G to have a super edge-magic total labeling, called super edge-magic deficiency of a graph G, is denoted by μs(G) [4]. If such vertices do not exist, then deficiency of G will be + ∞. In this paper we study the super edge-magic total labeling and deficiency of forests comprising of combs, 2-sided generalized combs and bistar. The evidence provided by these facts supports the conjecture proposed by Figueroa-Centeno, Ichishima and Muntaner-Bartle [2].

Keywords