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AKCE International Journal of Graphs and Combinatorics Volume 19, 2022 - Issue 3
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Articles

Independent 2-point set domination in graphs - II

Deepti JainDepartment of Mathematics, Sri Venkateswara College, University of Delhi, Delhi, IndiaCorrespondence[email protected]
&
Purnima GuptaDepartment of Mathematics, Sri Venkateswara College, University of Delhi, Delhi, India
Pages 201-205 | Received 12 Oct 2021, Accepted 21 Jun 2022, Published online: 06 Jul 2022

References

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  • Cockayne, E. J, Hedetniemi, S. T. (1977). Towards a theory of domination in graphs. Networks 7(3): 247–261.
  • Gross, J. L., Yellen, J, Zhang, P. (2014). Handbook of Graph Theory, Second Edition, CRC Press, Taylor and Francis Group.
  • Gupta, P, Jain, D. (2018). Bounds on 2-point set domination number of a graph. Discrete Math. Algorithm. Appl. 10(01): 1850012–1850015.
  • Gupta, P., Jain, D. (2016). Independent 2-point set domination in graphs In: International Conference on Theoretical Computer Science and Discrete Mathematics (pp. 281–288). Springer, Cham.
  • Gupta, P., Acharya, M, Jain, D. (2016). 2-Point set domination number of a cactus. Gulf J. Math 4(3): 80–89.
  • Haynes, T., Hedetniemi, S. T, Slater, P. J. (1998). Domination in Graphs - Advanced Topics. New York: Marcel Dekker.
  • West, D. B. (1996). Introduction to Graph Theory, Hoboken: Prentice Hall Inc.

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