Fully Indecomposable and Nearly Decomposable Graphs

Authors

  • Mehdi Aaghabali
  • Saieed Akbari
  • Masoud Ariannejad
  • Zakeieh Tajfirouz

DOI:

https://doi.org/10.11575/cdm.v11i2.62553

Keywords:

Permanent, Partly Decomposable, Fully Indecomposable, Factor.

Abstract

Let

A be an n-square non-negative matrix. If A contains no s\times t zero submatrix, where s + t = n, then it is called fully indecomposable. Also, a graph G is said to be fully indecomposable if its adjacency matrix is fully indecomposable. In this paper we provide some necessary and sucient conditions for a graph to be fully indecomposable. Among other results we prove that a regular connected graph is fully indecomposable if and only if it is not bipartite. 

 

 

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Published

2017-06-07

Issue

Section

Articles