References
- Anderson, F., Fuller, K. (1973). Rings and Categories of Modules. New York: Springer-Verlag.
- Bass, H. (1962). The Morita Theorems. Lecture Notes. Eugene: University of Oregon, pp. 9–14. http://hdl.handle.net/ 2027/coo.31924001140973
- Cortella, A., Lewis, D. W. (2013). Sesquilinear Morita equivalence and orthogonal sum of algebras with antiautomorphism. Commun. Algebra 41(12):4463–4490.
- Dasgupta, B. (2009). Hermitian Morita theory and unitary groups over semisimple rings. Commun. Algebra 37:213–233.
- Dasgupta, B. (2013). Hermitian Morita theory and unitary groups of hyperbolic quadratic modules over maximal orders in central simple algebras. Commun. Algebra 41(2):405–434.
- Frohlich, A., McEvett, A. M. (1969). Hermitian and quadratic forms over rings with involution. Quart. J. Math. Oxford Ser. 20:297–317.
- Hahn, A. (1985). A hermitian Morita theorem for algebras with anti-structure. J. Algebra 93:215–235.
- Hahn, A., O’Meara, O. T. (1989). The Classical Groups and K-Theory. New York: Springer-Verlag.
- Hahn, A., Zun-Xian, L. (1985). Hermitian Morita theory and hyperbolic unitary groups. J. Algebra 97:30–52.
- Hungerford, T. (1974). Algebra. New York: Springer Verlag.
- Knus, M. A. (1991). Quadratic and Hermitian Forms over Rings. Berlin, Heidelberg: Springer-Verlag.
- Lam, T.-Y. (1999). Lectures on Modules and Rings. New York: Springer Verlag.
- Marquez Hernandez, C. M. (1989). Contexto de Morita hermitica definido por una equivalencia, algebra and geometry. In: Proceedings of the II SBWAG, Santiago de Compostela.
- Verhaege, P., Verschoren, A. (1998). The hermitian Morita theorems. Divulg. Mat. 6(1):3–14.