References
- Abdian, A. Z. (2016). Graphs which are determined by their spectrum. Konuralp J. Math. 4: 34–41.
- Abdian, A. Z. (2016). Two classes of multicone graphs determined by their spectra. J. Math. Ext. 10: 111–121.
- Abdian, A. Z. (2017). Graphs cospectral with multicone graphs. Kw∇L(P), TWMS. J. Appl. Eng. Math. 7: 181–187.
- Abdian, A. Z. (2017). The spectral determination of the multicone graphs. Kw∇P, arXiv preprint. 1703.08728.
- Abdian, A. Z. (2023). Bell graphs are determined by their Laplacian spectra. Kragujevac J. Math. 47: 203–211.
- Oboudi, M. R., Abdian, A. Z., Ashrafi, A. R., and Beineke, L. W., (2021). Laplacian spectral determination of path-friend-ship graphs. AKCE Int. J. Graphs Comb. DOI: 10.1080/09728600.2021.1917321
- Abdian, A. Z., Ashrafi, A. R., Brunetti, M. (2020). Signless Laplacian spectral characterization of roses. Kuwait J. Sci. 47: 12–18.
- Abdian, A. Z., Behmaram, A., Fath-Tabar, G. H. (2020). Graphs determined by signless Laplacian spectra. AKCE Int. J. Graphs Comb. 17(1): 45–50.
- Abdian, A. Z., Beineke, L. W., Oboudi, M. R., Behmaram, A.,Thulasiraman, K., Alikhani, S., Zhao, K. (2020). On the spectral determinations of the connected multicone graphs Kr∇sKt. AKCE Int. J. Graphs Comb.17(1).
- Abdian, A. Z., Fath-Tabar, G. H., Moghaddam, M. R. (2020). The spectral determination of the multicone graphs Kw∇C with respect to their signless Laplacian spectra. J. Algebraic Systems 7(2): 131–141.
- Abdian, A. Z., Mirafzal, S. M. (2015). On new classes of multicone graph determined by their spectrums. Alg. Struct. Appl. 2: 23–34.
- Abdian, A. Z., Mirafzal, S. M. (2018). The spectral characterizations of the connected multicone graphs Kw∇LHS and Kw∇LGQ(3,9). Discrete Math. Algorithms Appl. 10: 1850019.
- Abdian, A. Z., Mirafzal, S. M. (2018). The spectral determinations of the connected multicone graphs Kw∇mP17 and Kw∇mS. Czech. Math. J. 68(4): 1091–1104.
- Abdian, A. Z., Moez, A. M. (2019). The spectral determinations of the join of two friendship graphs. Honam J. Math. 41: 67–87.
- Abdian, A. Z., Thulasiraman, K., Zhao, K. (2020). The spectral characterization of the connected multicone graphs Kw∇mKn,n. AKCE Int. J. Graphs Comb.17(1).
- Abdian, A. Z., Ziaie, M. (2019). Signless Laplacian spectral determinations of the starlike trees ST(n;d1) and the double starlike trees Hn(p;p). ARS Comb. In Press.
- Bapat, R. B. (2010). Graphs and Matrices, Vol. 27. London: Springer.
- Brandstädt, A., Le, V. B., Spinrad, J. P. (1999). Graph classes: A survey. SIAM Monographs Discrete Math. Appl.
- Cioabă, S. M., Haemers, W. H., Vermette, J. R., Wong, W. (2015). The graphs with all but two eigenvalues equal to ±1. J. Algebr. Comb. 41(3): 887–897.
- Cvetković, D., Rowlinson, P., Simić, S. (2010). An Introduction to the Theory of Graph Spectra. Cambridge: Cambridge University Press, pp. 230–231.
- Doob, M., Haemers, W. H. (2002). The complement of the path is determined by its spectrum. Linear Algebra Appl. 356(1-3): 57–65.
- Günthard, H. H., Primas, H. (1956). Zusammenhang von Graph Theory und Mo-Theorie von Molekeln mit Systemen konjugierter Bindungen. HCA 39(6): 1645–1653.
- Hong, Y., Shu, J., Fang, K. (2001). A sharp upper bound of the spectral radius of graphs. J. Combin., Theory Ser. B 81(2): 177–183.
- Knauer, U. (2011). Algebraic graph theory: morphisms, monoids and matrices. de Gruyters Studies in Mathematics, de Gruyters 41.
- Liu, M.-H. (2012). Some graphs determined by their (signless) Laplacian spectra. Czech Math. J. 62(4): 1117–1134.
- Liu, Y., Sun, Y. Q. (2010). On the second Laplacian spectral moment of a graph. Czech Math. J. 60(2): 401–410.
- Merris, R. (1994). Laplacian matrices of graphs: a survey. Linear Algebra Appl. 197–198: 143–176.
- Mirafzal, S. M., Abdian, A. Z. (2017). Spectral characterization of new classes of multicone graphs. Stud. Univ. Babes-Bolyai Math. 62(3): 275–286.
- Mirafzal, S. M., Abdian, A. Z. (2018). The spectral determinations of some classes of multicone graphs. J. Discrete Math. Sci. Cryptogr. 21(1): 179–189.
- Oboudi, M. R., Abdian, A. Z. (2020). Peacock graphs are determined by their Laplacian spectra. Iran. J. Sci. Technol. Trans. Sci. 44(3): 787–790.
- Peisert, W. (2001). All self-complementary symmetric graphs. J. Algebra 240(1): 209–229.
- Pouyandeh, S., Moez, A. M., Abdian, A. Z. (2019). The spectral determinations of connected multicone graphs. Kw∇mCP(n) Aims Math., 4: 1348–1356.
- Rowlinson, P. (2007). The main eigenvalues of a graph: a survey. Appl. Anal. Discrete Math. 1(2): 455–471.
- Sharafdini, R., Abdian, A. Z. (2018). Signless Laplacian determinations of some graphs with independent edges. Carpathian Math. Publ. 10(1): 185–191.
- Sharafdini, R., Abdian, A. Z. (2021). Signless Laplacian determination of path-friendship graphs Acta Math. Univ. Comenianae. In Press.
- Sharafdini, R., Abdian, A. Z., Behmaram, A. (2020). Signless laplacian determination of a family of double starlike trees. Ukrainian Math. J. In Press.
- Van Dam, E. R. (1998). Nonregular graphs with three eigenvalues. J. Combin. Theory, Ser. B 73(2): 101–118.
- van Dam, E. R., Haemers, W. H. (2003). Which graphs are determined by their spectrum? Linear Algebra Appl. 373: 241–272.
- van Dam, E. R., Haemers, W. H. (2009). Developments on spectral characterizations of graphs. Discrete Math. 309(3): 576–586.
- Wang, J., Belardo, F., Huang, Q., Borovićanin, B. (2010). On the two largest Q-eigenvalues of graphs. Discrete Math. 310(21): 2858–2866.
- Wang, J., Huang, Q. (2012). Spectral characterization of generalized cocktail-party graphs. J. Math. Res. Appl. 32: 666–672.
- Wang, J., Zhao, H., Huang, Q. (2012). Spectral characterization of multicone graphs. Czech Math. J. 62(1): 117–126.
- Zhang, Y., Liu, X., Yong, X. (2009). Which wheel graphs are determined by their Laplacian spectra? Comput. Math. Appl. 58(10): 1887–1890.