References
- Graham, R. L, Pollak, H. O. (1971). On the addressing problem for loop switching. Bell Syst. Tech. J. 50(8): 2495–2519.
- Balaban, A. T., Ciubotariu, D, Medeleanu, M. (1991). Topological indices and real number vertex invariants based on graph eigenvalues or eigenvectors. J. Chem. Inf. Model. 31(4): 517–523.
- Gutman, I, Medeleanu, M. (1998). On the structure-dependence of the largest eigenvalue of the distance matrix of an alkane. Indian J. Chem. 37A: 569–573.
- Consonni, V, Todeschini, R. (2008). New spectral indices for molecule description. MATCH Commun. Math. Comput. Chem. 60: 3–14.
- Todeschini, R, Consonni, V. (2000). Handbook of Molecular Descriptors. Weinheim: Wiley-VCH.
- Graham, R. L, Lovasz, L. (1978). Distance matrix polynomials of trees. Adv. Math. 29(1): 60–88.
- Ruzieh, S. N, Powers, D. L. (1990). The distance spectrum of the path Pn and the first distance eigenvector of connected graphs. Linear Multilinear Algebra 28(1–2): 75–81.
- Fowler, P. W., Caporossi, G, Hansen, P. (2001). Distance matrices, wiener indices, and related invariants of fullerenes. J. Phys. Chem. A. 105(25): 6232–6242.
- Lin, H. Q., Hong, Y., Wang, J. F, Shu, J. L. (2013). On the distance spectrum of graphs. Linear Algebra Appl. 439(6): 1662–1669.
- Atik, F, Panigrahi, P. (2015). On the distance spectrum of distance regular graphs. Linear Algebra Appl. 478: 256–273.
- Atik, F, Panigrahi, P. (2018). On the distance and distance signlesslaplacian eigenvalues of graphs and the smallest ger sˇ gorin disc. Electron. J. Linear Algebra 34: 191–204.
- Aalipour, G., Abiad, A., Berikkyzy, Z., Cummings, J., De Silva, J., Gao, W., Heysse, K., Hogben, L., Kenter, F. H., Lin, J. C. H., et al. (2016). On the distance spectra of graphs. Linear Algebra Appl. 497: 66–87.
- Alazemi, A., Anđelić, M., Koledin, T, Stanić, Z. (2017). Distance-regular graphs with small number of distinct distance eigenvalues. Linear Algebra Appl. 531: 83–97.
- Lu, L, Huang, Q. (2021). Distance eigenvalues of B(n, k). Linear Multilinear Algebra 69(11): 2078–2092.
- Pirzada, S., Ganie, H. A., Rather, B. A, Ul Shaban, R. (2020). On spectral spread of generalized distance matrix of a graph. Linear Multilinear Algebra 603: 1–19.
- Alhevaz, A., Baghipur, M., Ganie, H. A, Shang, Y. (2019). On the generalized distance energy of graphs. Mathematics 8(1): 17.
- DeVille, L. (2022). The generalized distance spectrum of a graph and applications. Linear Multilinear Algebra 70(13): 2425–2458.
- Guo, H, Zhou, B. (2020). On the distance α-spectral radius of a connected graph. J. Inequal. Appl. 2020(1): 1–21.
- Aouchiche, M, Hansen, P. (2014). Distance spectra of graphs: A survey. Linear Algebra Appl. 458: 301–386.
- Hogben, L, Reinhart, C. (2022). Spectra of variants of distance matrices of graphs and digraphs: a survey. La Mathematica. 1(1): 186–224.
- Brouwer, A. E, Haemers, W. H. (2011). Spectra of Graphs. Springer: Springer Science & Business Media.
- Bapat, R. B., Kirkland, S. J, Neumann, M. (2005). On distance matrices and Laplacians. Linear Algebra Appl. 401: 193–209.
- Laub, A. J. (2004). Matrix Analysis for Scientists and Engineers. Philadelphia: Society for Industrial and Applied Mathematics.
- Horn, R. A, Johnson, C. R. (2012). Matrix Analysis. Cambridge: Cambridge University Press.