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The Irregularity and Modular Irregularity Strength of Fan Graphs

Martin Bača, Zuzana Kimáková, Marcela Lascśaková, Andrea Semaničová–Feňovčíková

2021Symmetry21 citationsDOIOpen Access PDF

Abstract

For a simple graph G with no isolated edges and at most, one isolated vertex, a labeling φ:E(G)→{1,2,…,k} of positive integers to the edges of G is called irregular if the weights of the vertices, defined as wtφ(v)=∑u∈N(v)φ(uv), are all different. The irregularity strength of a graph G is known as the maximal integer k, minimized over all irregular labelings, and is set to ∞ if no such labeling exists. In this paper, we determine the exact value of the irregularity strength and the modular irregularity strength of fan graphs.

Topics & Concepts

CombinatoricsMathematicsVertex (graph theory)GraphSimple graphInteger (computer science)Discrete mathematicsComputer scienceProgramming languageGraph Labeling and Dimension ProblemsGraph theory and applicationsgraph theory and CDMA systems
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