References
- Plavsić D, Nikolić S, Trinajstić N, et al. On the Harary index for the characterization of chemical graphs. J Math Chem. 1993;12:235–250. doi: 10.1007/BF01164638
- Das KC. Maximum eigenvalue of the reciprocal distance matrix. J Math Chem. 2010;47:21–28. doi: 10.1007/s10910-009-9529-1
- Zhou B, Trinajstić N. Maximum eigenvalues of the reciprocal distance matrix and the reverse Wiener matrix. Int J Quantum Chem. 2008;108:858–864. doi: 10.1002/qua.21558
- Huang F, Li X, Wang S. On graphs with maximum Harary spectral radius; 2014. Available from arXiv:1411.6832v1.
- Bapat R, Panda SK. The spectral radius of the Reciprocal distance Laplacian matrix of a graph. Bull Iran Math Soc. 2018;44(5):1211–1216. doi: 10.1007/s41980-018-0084-z
- Alhevaz A, Baghipur M, Ramane HS. Computing the reciprocal distance signless Laplacian eigenvalues and energy of graphs. Le Matematiche. 2019;74(1):49–73.
- Varga R. Matrix iterative analysis. 2000. (Springer Series in Computational Mathematics).
- Medina L, Trigo M. Upper bounds and lower bounds for the spectral radius of Reciprocal distance, reciprocal distance Laplacian and Reciprocal distance signless Laplacian matrices. Linear Algebra Appl. Forthcoming. DOI:10.1016/j.laa.2020.09.024.
- Gutman I. The energy of a graph. Ber Math Stat Sekt Forschungsz Graz. 1978;103:1–22.
- McClelland BJ. Properties of the latent roots of a matrix: the estimation of π-electron energies. J Chem Phys. 1971;54:640–643. doi: 10.1063/1.1674889
- Koolen JH, Moulton V. Maximal energy graphs. Adv Appl Math. 2001;26:47–52. doi: 10.1006/aama.2000.0705
- Consonni V, Todeschini R. New spectral index for molecule description. MATCH Commun Math Comput Chem. 2008;60:3–14.
- Güngör AD, Çevik AS. On the Harary energy and Harary estrada index of a graph. MATCH Commun Math Comput Chem. 2010;64:281–296.
- Diaz R, Rojo O. Sharp upper bounds on the distance energies of a graph. Linear Algebra Appl. 2018;545:55–75. doi: 10.1016/j.laa.2018.01.032