Edge magic total labeling of lexicographic product C4(2r+1) o ~K2 cycle with chords, unions of paths, and unions of cycles and paths

Indonesian Journal of Combinatorics Pub Date : 2018-12-21 DOI:10.19184/IJC.2018.2.2.6

Inne Singgih

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引用次数: 1

Abstract

An edge magic total (EMT) labeling of a graph G = (V, E) is a bijection from the set of vertices and edges to a set of numbers defined by λ : V ∪ E → {1, 2, ..., ∣V∣ + ∣E∣} with the property that for every xy ∈ E, the weight of xy equals to a constant k, that is, λ(x) + λ(y) + λ(xy) = k for some integer k. In this paper given the construction of an EMT labeling for certain lexicographic product $C_{4(2r+1)}\circ \overline{K_2}$, cycle with chords ^[c]tC_n, unions of paths mP_n, and unions of cycles and paths m(C_{n₁(2r + 1)} ∪ (2r + 1)P_n₂).

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字典积C4(2r+1) 0 ~K2圈与弦、路径并集、环与路径并集的边魔幻全标记

图G = (V, E)的边幻全(EMT)标记是从顶点和边的集合到λ定义的一组数的双射:V∪E→{1,2，…，∣V∣+∣E∣}，给出了对于每一个xy∈E, xy的权值等于一个常数k，即对于某整数k， λ(x) + λ(y) + λ(xy) = k。本文给出了对于某一编法积$C_{4(2r+1)}\circ \overline{K_2}$，带弦环[c]tCn，路径的并集mPn，以及循环与路径的并集m(Cn1(2r +1)∪(2r+1) Pn2)的EMT标记的构造。

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Indonesian Journal of Combinatorics

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