References
- Andre, C. A. M. (1995). Basic characters of the unitriangular group. J. Algebra 175:287–319.
- Andre, C. A. M. (1995). Basic sums of coadjoint orbits of the unitriangular group. J. Algebra 176:959–1000.
- Andre, C. A. M. (2001). The basic character table of the unitriangular group. J. Algebra 241:437–471.
- Andre, C. A. M. (2002). The basic characters of the unitriangular group(for arbitrary primes). Proc. Am. Math. Soc. 130:1943–1954.
- Andrews, S. (2016). Supercharacter theory constructed by the method of little groups. Commun. Algebra 44: 2152–2179.
- Curtis, C. W., Reiner, I. (1962). Representation Theory of Finite Groups and Associative Algebras. New York, London: Inderscience Publisher.
- Diaconis, P., Isaacs, I. M. (2008). Supercharacters and superclasses for algebra groups. Trans. Am. Math. Soc. 360:2359–2392.
- Etingof, P., Golberg, O., Hensel, S., Liu, T., Schwendner, A., Vaintrob, D., Yudovina, E., with historical interludes by Gerovitch, S. (2011). Introduction to Representation Theory. Providence, Rhode Island: American Mathemarical Society.
- Hendrickson, A. O. F. (2012). Supercharacter theory constructions corresponding to Schur ring products. Commun. Algebra 40:4420–4438.
- Isaacs, I. M., Karagueuzian, D. (2005). Involution and characters of upper triangular matrix groups. Math. Comput. 74:2027–2033.
- Kazhdan, D. (1977). Proof of Springer hypothesis. Israil J.Math. 28:272–284.
- Kirillov, A. A. (1995). Variations on the triangular theme. Am. Math. Soc. Transl. 169:43–73.
- Lang, A. (2014). Supercharacter theories and semidirect products. Available at: arXiv 1405.1764.
- Pierce, R. S. (1982). Associative Algebras. Vol. 88 of Graduate Texts in Mathematics. New-York, Heidelberg, Berlin: Springer-Verlag.
- Panov, A. N. (2015). Invariants of the coadjoint action on the basic varieties of the unitriangular group. Transfor. Groups 20:229–246.
- Panov, A. N. (2016). Supercharacter theory for groups of invertible elements of reduced algebras. St. Petersburg Math. J. 27:1035–1047.
- Serr, J.-P. (1977). Linear Representations of Finite Groups. New-York: Springer-Verlag.
- Yan, N. (2001). Representation Theory of finite unipotent linear groups. Ph.D. thesis, Philadelphia: University of Pennsylvania (see also arXiv: 1004.2674).