[1] A. Alhevaz, M. Baghipur, E. Hashemi and S. Paul, On the sum of the distance signless Laplacian eigenvalues of a
graph and some inequalities involving them, Discrete Math. Algorithms Appl., 12 (2020) 17 p.
[2] A. Alhevaz, M. Baghipur,Hilal A. Ganie and S. Pirzada, Brouwer type conjecture for the eigenvalues of distance
signless Laplacian matrix of a graph, Linear and Multilinear Algebra, 69 (2019) 2423–2440.
[3] A. Alhevaz, M. Baghipur, E. Hashemi and H. S. Ramane, On the distance signless Laplacian spectrum of graphs,
Bull. Malays. Math. Sci. Soc. (2), 42 (2019) 2603–2621.
[4] A. Alhevaz, M. Baghipur and E. Hashemi, On distance signless Laplacian spectrum and energy of graphs, Electron.
J. Graph Theory Appl., 6 (2018) 326–340.
[5] A. Alhevaz, M. Baghipur and S. Paul, Spectrum of graphs obtained by operations, Asian-Eur. J. Math., 13 (2020)
8 p.
[6] A. Alhevaz, M. Baghipur and Somnath Paul, New bounds and extremal graphs for distance signless Laplacian spectral
radius, J. Algebr. Syst., 8 (2021) 231–250.
[7] A. Alhevaz, M. Baghipur, Sh. Pirzada and Y. Shang, Some Inequalities involving the distance signless Laplacian
eigenvalues of graphs, Trans. Comb., 10 No. 1 (2021) 9–29.
[8] A. Alhevaz, M. Baghipur, Hilal A. Ganie and Y. Shang, The generalized distance spectrum of the join of graphs,
Symmetry, 12 (2020) 9 p.
[9] A. E. Brouwer and W. H. Haemers, Spectra of graphs, Universitext. Berlin: Springer, (2012).
[10] D. M. Cvetković, M. Doob and H. Sachs, Spectra of graphs: theory and application, Pure and applied mathematics,
Academic Press, (1980).
[11] Sh.-Y. Cuia, J.-X. He and G.-X. Tian, The generalized distance matrix, Linear Algebra Appl., 563 (2019) 1–23.
[12] P. J. Davis, Circulant Matrices, AMS Chelsea Publishing Series, American Mathematical Society, (1994).
[13] F. Buckley and F. Harary, On the Euclidean dimension of a wheel, Graphs Comb., 4 (1988) 23–30.
[14] Hilal A. Ganie, On distance Laplacian spectrum (energy) of graphs, Discrete Math. Algorithms Appl., 12 (2020).
[15] M. Aouchiche and P. Hansen, On the distance signless Laplacian of a graph, Linear Multilinear Algebra, 64 (2016)
1113–1123.
[16] M. Aouchiche and P. Hansen, Some properties of the distance Laplacian eigenvalues of a graph, Czech. Math. J., 64
(2014) 751–761.
[17] M. Aouchiche and P. Hansen, Two Laplacians for the distance matrix of a graph, Linear Algebra Appl., 439 (2013)
21–33.
[18] S. Pirzada, B. A. Rather, M. Aijaz and T. A.Chishti, On distance signless Laplacian spectrum of graphs and spectrum
of zero divisor graphs of Zn , Linear Multilinear Algebra, (2020) 1–16.