Topological Indices Over Nonzero Component Graph of a Finite Dimensional Vector Space

Topological Indices Over Nonzero Component Graph of a Finite Dimensional Vector Space

The study of graphs associated with of various algebraic structures is an emerging topic in algebraic graph theory. Recently, the concept of nonzero component graph of a finite dimensional vector space \(\Gamma(\mathbb{V})\) was put forward by Das \cite{5}. In this paper, we study some degree based...

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Veröffentlicht in:arXiv.org 2020-08
1. Verfasser: Hosamani, Sunilkumar M
Format: Artikel
Sprache:eng
Schlagworte:
Algebra
Graph theory
Graphs
Topology
Vector space
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Zusammenfassung:The study of graphs associated with of various algebraic structures is an emerging topic in algebraic graph theory. Recently, the concept of nonzero component graph of a finite dimensional vector space \(\Gamma(\mathbb{V})\) was put forward by Das \cite{5}. In this paper, we study some degree based topological indices over \(\Gamma(\mathbb{V})\) the derived graphs of \(\Gamma(\mathbb{V})\).
ISSN:2331-8422