Please use this identifier to cite or link to this item: https://repository.unej.ac.id/xmlui/handle/123456789/99358
Title: Local Irregular Vertex Coloring of Some Families Graph
Authors: KRISTIANA, Arika Indah
ALFARISI, Ridho
DAFIK, Dafik
AZAHRA, Nadia
Keywords: Local irregularity vertex coloring
Chromatic number local irregular
Issue Date: 9-Jun-2020
Publisher: Journal of Discrete Mathematical Sciences and Cryptography, (DOI : 10.1080/09720529.2020.1754541)
Abstract: All graph in this paper is connected and simple graph. Let d(u, v) be a distance between any vertex u and v in graph G = (V, E ). A function : ( ) l V G {1, 2, , } k →  is called vertex irregular k-labelling and w V G N→ : () where wu ( ) l v ( ). If for every ∈ = Σ uv EG wu wv∈ ≠ ( ), ( ) ( ) and v Nu ( ) opt l ( ) min(max( );i i vertex irregular labelling) is called a local irregularity vertex coloring. = l l The minimum cardinality of the largest label over all such local irregularity vertex coloring is called chromatic number local irregular, denoted by clis(G). In this paper, we study about local irregularity vertex coloring of families graphs, namely triangular book graph, square book graph, pan graph, subdivision of pan graph, and grid graphs.
URI: http://repository.unej.ac.id/handle/123456789/99358
Appears in Collections:LSP-Jurnal Ilmiah Dosen

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