Abstract
AbstractIn this paper, we study specific striped maximal outer planar graph (MOP) in the view of super edge-magic sequences (SEMS). Also, we derive a formula for the Wiener index (WI) of above MOP graph which is having SEMS. We analyze graphical properties like independence number, chromatic number, dominance number, and matching number of specific striped MOP graph through SEMS.
Highlights
We have considered all the graphs which are simple and finite. Kotzig and Rosa (1970) introduced the concepts of magic valuation
We present some significant results in maximal outer planar graph (MOP)
Theorem 4.1.1 Let G be a graph with n vertices and 2n − 3 edges
Summary
We have considered all the graphs which are simple and finite. Kotzig and Rosa (1970) introduced the concepts of magic valuation. We have considered all the graphs which are simple and finite. Kotzig and Rosa (1970) introduced the concepts of magic valuation. Ringle and Laldo called this type of valuation as edge-magic labeling (Ringel & Llado, 1996; Wallis, Baskoro, Miller, & Slamin, 2000). The concept of super edge-magic was introduced by Enomoto, Llado, Nakamigawa, and Ringel (1998) and Chen (2001)
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