___

• [1] Z. Balogh, On unitary subgroups of group algebras, Int. Electron. J. Algebra 29(29) (2021) 187–198.
• [2] Z. Balogh, V. Bovdi, The isomorphism problem of unitary subgroups of modular group algebras, Publ. Math. Debrecen 97(1-2) (2020) 27–39.
• [3] Z. Balogh, L. Creedon, J. Gildea, Involutions and unitary subgroups in group algebras, Acta Sci. Math. (Szeged) 79(3-4) (2013) 391–400.
• [4] Z. Balogh, V. Laver. Unitary subgroups of commutative group algebras of characteristic 2. Ukraïn. Mat. Zh. 72(6) (2020) 751–757.
• [5] A. Bovdi, L. Erdei, Unitary units in modular group algebras of groups of order 16, Tech. Rep., Univ. Debrecen, L. Kossuth Univ. 4(157) (1996) 1–16.
• [6] A. Bovdi, L. Erdei. Unitary units in modular group algebras of 2-groups. Comm. Algebra 28(2) (2000) 625–630.
• [7] A. Bovdi, P. Lakatos, On the exponent of the group of normalized units of modular group algebras, Publ. Math. Debrecen 42(3-4) (1993) 409–415.
• [8] A. Bovdi, A. Szakács, Units of commutative group algebra with involution, Publ. Math. Debrecen 69(3) (2006) 291–296.
• [9] A. A. Bovdi, Unitarity of the multiplicative group of an integral group ring, Mat. Sb. (N.S.) 47(2) (1984) 377–389.
• [10] A. A. Bovdi, A. A. Sakach, Unitary subgroup of the multiplicative group of a modular group algebra of a finite abelian p-group. Mat. Zametki 45(6) (1989) 445–450.
• [11] A. A. Bovdi, A.Szakács, A basis for the unitary subgroup of the group of units in a finite commutative group algebra, Publ. Math. Debrecen 46(1-2) (1995) 97–120.
• [12] V. Bovdi, L. G. Kovács, Unitary units in modular group algebras, Manuscripta Math. 84(1) (1994) 57–72.
• [13] V. Bovdi, A. L. Rosa, On the order of the unitary subgroup of a modular group algebra, Comm. Algebra 28(4) (2000) 1897–1905.
• [14] V. Bovdi, M. Salim, On the unit group of a commutative group ring, Acta Sci. Math. (Szeged) 80(3-4) (2014) 433–445.
• [15] V. A. Bovdi, A. N. Grishkov, Unitary and symmetric units of a commutative group algebra, Proc. Edinb. Math. Soc. 62(3) (2019) 641–654.
• [16] L. Creedon, J. Gildea, Unitary units of the group algebra $F_{2^k}D_8$, Internat. J. Algebra Comput. 19(2) (2009) 283–286.
• [17] L. Creedon, J. Gildea, The structure of the unit group of the group algebra$F_{2^k}D_8$, Canad. Math. Bull. 54(2) (2011) 237–243.
• [18] J. Gildea, The structure of the unitary units of the group algebra $F_{2^k}D_8$, Int. Electron. J. Algebra 9 (2011) 171–176.
• [19] D. W. Lewis. Involutions and anti-automorphisms of algebras, Bull. London Math. Soc. 38(4) (2006) 529–545.
• [20] S. P. Novikov, Algebraic construction and properties of Hermitian analogs of K-theory over rings with involution from the viewpoint of Hamiltonian formalism. Applications to differential topology and the theory of characteristic classes. I. II, Izv. Akad. Nauk SSSR Ser. Mat. 34 (1970) 253–288, ibid. 34 (1970) 475–500.
• [21] J. -P. Serre, Bases normales autoduales et groupes unitaires en caractéristique 2, (French) [Self-dual normal bases and unitary groups of characteristic 2], Transform. Groups 19(2) (2014) 643–698.
• [22] Y. Wang, H. Liu, The unitary subgroups of group algebras of a class of finite p-groups, J. Algebra Appl. (2021).