References
- Chung, F., Füredi, Z., Graham, R, Seymour, P. (1988). On induced subgraphs of the cube. J. Comb. Theory, Ser. A. 49(1): 180–187.
- Dong, D. (2021). On induced subgraphs of the Hamming graph. J. Graph Theory 96(1): 160–166.
- Ghasemian, E, Fath-Tabar, G. H. (2017). On signed graphs with two distinct eigenvalues. Filomat. 31(20): 6393–6400.
- D. A, G. (2012). Spectra of signed adjacency matrices, Queens-R.M.C. Discrete Mathematics Seminar, February 27. Available at: https://pdfs.semanticscholar.org/eb2e/078a4a4d8dcfeed9e86417e17ecbb91696e0.pdf.
- Hong, Z.-M., Lai, H.-J, Liu, J. (2021). Induced subgraphs of product graphs and a generalization of Huangs theorem. J. Graph Theory. 98(2): 285–308.
- Hou, Y., Tang, Z, Wang, D. (2019). On signed graphs with just two distinct adjacency eigenvalues. Discrete Math. 342(12): 111615.
- Huang, H. (2019). Induced graphs of the hypercube and a proof of the Sensitivity Conjecture. Ann. Math. 190: 949–955.
- Kee, J. M, Smyth, C. (2007). Integer symmetric matrices having all their eigenvalues in the interval [-2, 2]. J. Algebra. 317(1): 260–290.
- Fisk, S. (2005). A very short proof of Cauchys interlace theorem for eigenvalues of Hermitian matrices. Amer. Math. Monthly. 112(2): 118.
- Ramezani, F. (2022). Some regular signed graphs with only two distinct eigenvalues. Linear Multilinear Algebra. 70(3): 517–530.
- Stanić, Z. (2020). Spectra of signed graphs with two eigenvalues. Appl. Math. Comput. 364: 124627.