Advanced search
Publication Cover
Polycyclic Aromatic Compounds Volume 42, 2022 - Issue 9
Submit an article Journal homepage
68
Views
1
CrossRef citations to date
0
Altmetric
Research Articles

Resistance Distance-Based Indices and Spanning Trees of Linear Pentagonal-Quadrilateral Networks

Umar AliSchool of Mathematical Sciences, Anhui University, Hefei, Anhui, P.R. ChinaView further author information
,
Yasir AhmadSchool of Mathematical Sciences, Anhui University, Hefei, Anhui, P.R. ChinaView further author information
,
Si-Ao XuSchool of Mathematical Sciences, Anhui University, Hefei, Anhui, P.R. ChinaView further author information
&
Xiang-Feng PanSchool of Mathematical Sciences, Anhui University, Hefei, Anhui, P.R. ChinaCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0001-5301-8739View further author information
ORCID Icon
Pages 6352-6371 | Received 03 Jun 2021, Accepted 09 Sep 2021, Published online: 30 Sep 2021

References

  • R. B. Bapat, Graphs and Matrices (New York: Springer, 2010).
  • J. A. Bondy, and U. S. R. Murty, Graph Theory with Applications (London: McMillan, 1976).
  • F. Buckley, and F. Harary, Distance in Graphs (Reading, MA: Addison-Wesley, 1989).
  • H. Wiener, “Structural Determination of Paraffin Boiling Points,” Journal of the American Chemical Society 69, no. 1 (1947): 17–20.
  • A. Dobrynin, R. Entringer, and I. Gutman, “Wiener Index of Trees: Theory and Application,” Acta Applicandae Mathematicae 66, no. 3 (2001): 211–49.
  • I. Gutman, “Selected Properties of the Schultz Molecular Topological Index,” Journal of Chemical Information and Computer Sciences 34, no. 5 (1994): 1087–9.
  • D. J. Klein, and M. Randić, “Resistance Distance,” Journal of Mathematical Chemistry 12, no. 1 (1993): 81–95.
  • H. Y. Zhu, D. J. Klein, and I. Lukovits, “Extensions of the Wiener Number, Journal of Chemical Information and Computer Sciences 36, no. 3 (1996): 420–8.
  • I. Gutman, and B. Mohar, “The Quasi-Wiener and the Kirchhoff Indices Coincide,” Journal of Chemical Information and Computer Sciences 36, no. 5 (1996): 982–5.
  • F. R. K. Chung, Spectral Graph Theory (Providence, RI: American Mathematical Society, 1997).
  • H. Y. Chen, and F. J. Zhang, “Resistance Distance and the Normalized Laplacian Spectrum,” Discrete Applied Mathematics 155, no. 5 (2007): 654–61.
  • E. Bendito, A. Carmona, A. M. Encinas, and J. M. Gesto, “A Formula for the Kirchhoff Index,” International Journal of Quantum Chemistry 108, no. 6 (2008): 1200–6.
  • M. Bianchi, A. Cornaro, J. L. Palacios, and A. Torriero, “Bounds for the Kirchhoff Index via Majorization Techniques,” Journal of Mathematical Chemistry 51, no. 2 (2013): 569–87.
  • L. H. Feng, I. Gutman, and G. H. Yu, “Degree Kirchhoff Index of Unicyclic Graphs,” MATCH Communications in Mathematical and in Computer Chemistry 69 (2013): 629–48.
  • J. L. Palacios, “Closed-Form Formulas for Kirchhoff Index,” International Journal of Quantum Chemistry 81, no. 2 (2001): 135–40.
  • J. Huang, S. C. Li, and X. C. Li, “The Normalized Laplacian Degree-Kirchhoff Index and Spanning Trees of the Linear Polyomino Chains,” Applied Mathematics and Computation 289 (2016): 324–34.
  • D. Q. Li, and Y. P. Hou, “The Normalized Laplacian Spectrum of Quadrilateral Graphs and Its Applications,” Applied Mathematics and Computation 297 (2017): 180–8.
  • S. C. Li, W. T. Sun, and S. J. Wang, “Multiplicative Degree-Kirchhoff Index and Number of Spanning Trees of a Zigzag Polyhex Nanotube TUHC[2n, 2],” International Journal of Quantum Chemistry 119, no. 17 (2019): e25969.
  • X. L. Ma, and H. Bian, “The Normalized Laplacians, Degree-Kirchhoff Index and the Spanning Trees of Hexagonal Mobius Graphs,” Applied Mathematics and Computation 355 (2019): 33–46.
  • J. Zhao, J. B. Liu, and S. Hayat, “Resistance Distance-Based Invariants and the Number of Spanning Trees of Linear Crossed Octagonal Graphs,” Journal of Applied Mathematics and Computing 63, no. 1–2 (2020): 1–27.
  • X. Ma, and H. Bian, “The Normalized Laplacians, Degree-Kirchhoff Index and the Spanning Trees of Cylinder Phenylene Chain,” Polycyclic Aromatic Compounds 41, no. 6 (2021): 1159–79.
  • J. B. Liu, J. Zhao, Z. Zhu, and J. Cao, “On the Normalized Laplacian and the Number of Spanning Trees of Linear Heptagonal Networks,” Mathematics 7, no. 4 (2019): 314.
  • R. A. Bapat, M. Karimi, and J. B. Liu, “Kirchhoff Index and Degree Kirchhoff Index of Complete Multipartite Graphs,” Discrete Applied Mathematics 232 (2017): 41–9.
  • C. He, S. C. Li, W. Luo, and L. Sun, “Calculating the Normalized Laplacian Spectrum and the Number of Spanning Trees of Linear Pentagonal Chains,” Journal of Computational and Applied Mathematics 344 (2018): 381–93.
  • Z. Li, Z. Xie, J. Li, and Y. Pan, “Resistance Distance-Based Graph Invariants and Spanning Trees of Graphs Derived from the Strong Prism of a Star,” Applied Mathematics and Computation 382 (2020): 125335.
  • Y. X. Li, S. A. Xu, H. Hua, and X. F. Pan, “On the Resistance Diameter of the Cartesian and Lexicographic Product of Paths,” Journal of Applied Mathematics and Computing. Advance online publication. doi: 10.1007/s12190-021-0158-w
  • S. C. Li, W. Wei, and S. Yu, “On Normalized Laplacians, Multiplicative Degree-Kirchhoff Indices and Spanning Trees of the Linear [n]Phenylenes and Their Dicyclobutadieno Derivatives,” International Journal of Quantum Chemistry 119, no. 8 (2019): e25863.
  • Q. Li, S. Zaman, W. Sun, and J. Alam, “Study on the Normalized Laplacian of a Penta-Graphene with Applications,” International Journal of Quantum Chemistry 120, no. 9 (2020): e26154.
  • J. B. Liu, Z. Y. Shi, Y. H. Pan, J. Cao, M. A. Aty, and U. A. Juboori, “Computing the Laplacian Spectrum of Linear Octagonal-Quadrilateral Networks and Its Applications,” Polycyclic Aromatic Compounds. Advance online publication. doi: 10.1080/10406638.2020.1748666
  • Y. G. Pan, and J. P. Li, “Kirchhoff Index, Multiplicative Degree-Kirchhoff Index and Spanning Trees of the Linear Crossed Hexagonal Chains,” International Journal of Quantum Chemistry 118, no. 24 (2018): e25787.
  • Y. Pan, J. Li, S. Li, and W. Luo, “On the Normalized Laplacians with Some Classical Parameters Involving Graph Transformations,” Linear and Multilinear Algebra 68, no. 8 (2020): 1534–56.
  • M. S. Sardar, X. F. Pan, and S. A. Xu, “Computation of Resistance Distance and Kirchhoff Index of the Two Classes of Silicate Networks,” Applied Mathematics and Computation 381 (2020): 125283.
  • Y. Wang, and W. W. Zhang, “Kirchhoff Index of Linear Pentagonal Chains,”International Journal of Quantum Chemistry 110, no. 9 (2010): 1594–604.
  • Z. X. Zhu, and J. B. Liu, “The Normalized Laplacian, Degree-Kirchhoff Index and the Spanning Tree Numbers of Generalized Phenylenes,” Discrete Applied Mathematics 254 (2019): 256–67.
  • F. Zhang (Ed.), The Schur Complement and Its Spplications (NewYork: Springer, 2005).
  • I. Gutman, and S. J. Cyvin, Introduction to the Theory of Benzenoid Hydrocarbons (Berlin Heidelberg: Springer-Verlag, 1989).

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.