Necessary and sufficient conditions for quasi-strongly regularity of Graph Product

Tuan Minh Do, Hoa Dinh Vu
Author affiliations

Authors

  • Tuan Minh Do Department of Natural Sciences, Nam Dinh Teacher Training College, PhD Student in VNU, Hanoi University of Science
  • Hoa Dinh Vu Department of Information Technology, Hanoi University of Education

DOI:

https://doi.org/10.15625/1813-9663/34/2/12489

Keywords:

quasi-strongly regular graph, product graph

Abstract

A $k$-regular graph ($k\ge 1$) with $n$ vertices is called a quasi-strongly regular graph with parameter $\lambda$ ($\lambda\in\NN$) if any two adjacent vertices have exactly $\lambda$ neighbors in common.A graph product is a binary operation on graphs. In this paper we prove some necessary and sufficient conditions for Decartes Product, Tensor Product, Lexicographical product and Strong product to be quasi-strongly regular.

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References

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Published

03-10-2018

How to Cite

[1]
T. M. Do and H. D. Vu, “Necessary and sufficient conditions for quasi-strongly regularity of Graph Product”, JCC, vol. 34, no. 2, pp. 161–169, Oct. 2018.

Issue

Section

Computer Science