https://orcid.org/0000-0002-9620-7692
References
- F.R.K. Chung, Spectral Graph Theory (Providence, RI: American Mathematical Society, 1997).
- H. Wiener, “Structural Determination of Paraffin Boiling Points,” Journal of the American Chemical Society 69, no. 1 (1947): 17–20.
- A. Dobrynin, “Branchings in Trees and the Calculation of the Wiener Index of a Tree,” Match Communications in Mathematical and in Computer Chemistry 41 (2000): 119–134.
- A. A. Dobrynin, R. Entringer, and I. Gutman, “Wiener Index of Trees: Theory and Applications,” Acta Applicandae Mathematicae 66, no. 3 (2001): 211–249.
- I. Gutman, S. C. Li, and W. Wei, “Cacti with n Vertices and t Cycles Having Extremal Wiener Index,” Discrete Applied Mathematics 232 (2017): 189–200.
- S. C. Li, and Y. B. Song, “On the Sum of All Distances in Bipartite Graphs,” Discrete Applied Mathematics 169 (2014): 176–185.
- I. Gutman, “Selected Properties of the Schultz Molecular Topological Index,” Journal of Chemical Information and Modeling 34, no. 5 (1994): 1087–1089.
- D. J. Klein and M. Randić, “Resistance Distances,” Journal of Mathematical Chemistry 12, no. 1 (1993): 81–95.
- D. J. Klein, “Resistance-Distance Sum Rules,” Croatica Chemica Acta 75 (2002): 633–649.
- D. J. Klein and O. Ivanciuc, “Graph Cyclicity, Excess Conductance, and Resistance Deficit,” Journal of Mathematical Chemistry 30, no. 3 (2001): 271–287.
- H. Y. Chen and F. J. Zhang, “Resistance Distance and the Normalized Laplacian Spectrum,” Discrete Applied Mathematics 155, no. 5 (2007): 654–661.
- Y. L. Yang and T. Y. Yu, “Graph Theory of Viscoelasticities for Polymers with Starshaped, Multiple-Ring and Cyclic Multiple-Ring Molecules,” Die Makromolekulare Chemie 186, no. 3 (1985): 609–631.
- Y. J. Yang and H. P. Zhang, “Kirchhoff Index of Linear Hexagonal Chains,” International Journal of Quantum Chemistry 108, no. 3 (2008): 503–512.
- J. Huang, S. C. Li, and X. Li, “The Normalized Laplacian, Degree-Kirchhoff Index and Spanning Trees of the Linear Polyomino Chains,” Applied Mathematics and Computation 289 (2016): 324–334.
- 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): 256–267.
- J. Huang, S. C. Li, and L. Sun, “The Normalized Laplacians Degree-Kirchhoff Index and the Spanning Trees of Linear Hexagonal Chains,” Discrete Applied Mathematics 207 (2016): 67–79.
- Y. G. Pan, J. P. Li, S. C. Li, and W. J. Luo, “On the Normalized Laplacians with Some Classical Parameters Involving Graph Transformations,” Linear and Multilinear Algebra (2018): 1–23.
- J. B. Liu, J. Zhao, and Z. Zhu, “On the Number of Spanning Trees and Normalized Laplacian of Linear Octagonal-Quadrilateral Networks,” International Journal of Quantum Chemistry 119, no. 17 (2019): e25971.
- Y. J. Yang, Y. L. Cao, H. Y. Yao, J. Li, “Solution to a conjecture on a Nordhaus-Gaddum type result for the Kirchhoff index,” Applied Mathematics and Computation 332 (2018): 241–249.
- Y. Pan and J. 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.
- L. Lei, X. Geng, S. C. Li, Y. J. Peng, and Y. Yu, “On the Normalized Laplacian of Mobius Phenylene Chain and Its Applications,” International Journal of Quantum Chemistry 119, no. 24 (2019): e26044.
- X. Ma and H. Bian, “The Normalized Laplacians, Degree-Kirchhoff Index and the Spanning Trees of Cylinder Phenylene Chain,” Polycyclic Aromatic Compounds 119 (2019): 1–21.
- S. C. Li, W. Wei, and S. Q. 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.
- I. Gutman and B. Mohar, “The Quasi-Wiener and the Kirchhoff Indices Coincide,” Journal of Chemical Information and Computer Sciences 36, no. 5 (1996): 982–985.