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A Note on Laplacian Spectrum of Complementary Prisms

Year 2019, Volume: 11, 72 - 80, 30.12.2019

Abstract

In this work, the Laplacian spectrum of Complementary Prism graph is considered. The complementary prism operation was introduced by Haynes et al. and denoted by $G\bar{G}$. Some upper and lower bounds obtained using majorization and operator definition of Laplacian. Beside Cardoso et al.'s results in literature about Laplacian spectrum of complementary prisms, an alternative proof about nonzero minimum and maximum Laplacian eigenvalue of complementary prism that contains disconnected components in the underlying graph $G$ or  $\bar{G}$ is provided. Also using this result, the lower and upper bound of nonzero minimum and maximum Laplacian eigenvalue of the complementary prism graph is emphasized.

References

  • Cardoso, D.M., Carvalho, P., de Freitas, M.A.A., Vinagre, C.T.M., {\em Spectra, signless Laplacian and Laplacian spactra of complementary prisms of graphs}, Linear Algebra and its Appl., \textbf{544}(2018), 325--338.
  • Fiedler, M., {\em Algebraic connectivity of graphs}, Czech. Math. J., \textbf{23}(1973), 298--305.
  • Grone, R., Merris, R., {\em Coalescence, majorization, edge valuations and the Laplacian spectra of graphs}, Linear Multilinear Algebra, \textbf{27}(1990), 139--146.
  • Haynes, T.W., Henning, M.A., van der Merwe, L.C., {\em Domination and total domination in complementary prisms}, J. Comb. Optim., \textbf{18}(2009), 23--37.
Year 2019, Volume: 11, 72 - 80, 30.12.2019

Abstract

References

  • Cardoso, D.M., Carvalho, P., de Freitas, M.A.A., Vinagre, C.T.M., {\em Spectra, signless Laplacian and Laplacian spactra of complementary prisms of graphs}, Linear Algebra and its Appl., \textbf{544}(2018), 325--338.
  • Fiedler, M., {\em Algebraic connectivity of graphs}, Czech. Math. J., \textbf{23}(1973), 298--305.
  • Grone, R., Merris, R., {\em Coalescence, majorization, edge valuations and the Laplacian spectra of graphs}, Linear Multilinear Algebra, \textbf{27}(1990), 139--146.
  • Haynes, T.W., Henning, M.A., van der Merwe, L.C., {\em Domination and total domination in complementary prisms}, J. Comb. Optim., \textbf{18}(2009), 23--37.
There are 4 citations in total.

Details

Primary Language English
Subjects Mathematical Sciences
Journal Section Articles
Authors

Hande Tunçel Gölpek 0000-0001-9183-6732

Publication Date December 30, 2019
Published in Issue Year 2019 Volume: 11

Cite

APA Tunçel Gölpek, H. (2019). A Note on Laplacian Spectrum of Complementary Prisms. Turkish Journal of Mathematics and Computer Science, 11, 72-80.
AMA Tunçel Gölpek H. A Note on Laplacian Spectrum of Complementary Prisms. TJMCS. December 2019;11:72-80.
Chicago Tunçel Gölpek, Hande. “A Note on Laplacian Spectrum of Complementary Prisms”. Turkish Journal of Mathematics and Computer Science 11, December (December 2019): 72-80.
EndNote Tunçel Gölpek H (December 1, 2019) A Note on Laplacian Spectrum of Complementary Prisms. Turkish Journal of Mathematics and Computer Science 11 72–80.
IEEE H. Tunçel Gölpek, “A Note on Laplacian Spectrum of Complementary Prisms”, TJMCS, vol. 11, pp. 72–80, 2019.
ISNAD Tunçel Gölpek, Hande. “A Note on Laplacian Spectrum of Complementary Prisms”. Turkish Journal of Mathematics and Computer Science 11 (December 2019), 72-80.
JAMA Tunçel Gölpek H. A Note on Laplacian Spectrum of Complementary Prisms. TJMCS. 2019;11:72–80.
MLA Tunçel Gölpek, Hande. “A Note on Laplacian Spectrum of Complementary Prisms”. Turkish Journal of Mathematics and Computer Science, vol. 11, 2019, pp. 72-80.
Vancouver Tunçel Gölpek H. A Note on Laplacian Spectrum of Complementary Prisms. TJMCS. 2019;11:72-80.