References
- Abrar, M. (2012). Dominant dimensions of two classes of finite dimensional algebras. Preprint, Available at: http://arxiv.org/pdf/1209.0562v1.pdf, Last accessed date 4 September 2012.
- Asadollahi, J., Eshraghi, H., Hafezi, R., Salarian, Sh. (2011). On the homotopy categories of projective and injective representations of quivers. J. Algebra 346:101–115.
- Assem, I., Simson, D., Skowronski, A. (2006). Elements of the representation theory of associative algebras. Vol. 1. In: Techniques of Representation Theory. London Mathematical Society Student Texts, Vol. 65. Cambridge: Cambridge University Press.
- Auslander, M., Reiten, I. (1975). On a generalized version of the Nakayama conjecture. Proc. Am. Math. Soc. 52:69–74.
- Auslander, M., Reiten, I. (1994). k-Gorenstein algebras and syzygy modules. J. Pure Appl. Algebra 92(1):1–27.
- Auslander, M., Reiten, I. (1996). Syzygy modules for Noetherian rings. J. Algebra 183(1):167–185.
- Crawley-Boevey, W. Lectures on representations of quivers. A graduate course given in 1992 at Oxford University, Available at: http://www1.maths.leeds.ac.uk/~pmtwc/quivlecs.pdf.
- Enochs, E., Estrada, S. (2005). Projective representations of quivers. Commun. Algebra 33:3467–3478.
- Enochs, E., Estrada, S., Garcia Rozas, J. R. (2009). Injective representations of infinite quivers. Appl. Canad. J. Math. 61:315–335.
- Enochs, E., Garcia Rozas, J. R., Oyonarte, L., Park, S. (2002). Noetherian quivers. Quaest. Math. 25(4):531–538.
- Enochs, E., Herzog, I. (1999). A homotopy of quiver morphisms with applications to representations. Canad. J. Math. 51(2):294–308.
- Enochs, E., Kim, H., Park, S. (2009). Injective covers and envelopes of representations of linear quivers. Commun. Algebra 37(2):515–524.
- Enochs, E., Oyonarte, L., Torrecillas, B. (2004). Flat covers and flat representations of quivers. Commun. Algebra 32(4):1319–1338.
- Fossum, R. M., Griffith, P. A., Reiten, I. (1975). Trivial Extensions of Abelian Categories. Lecture Notes in Mathematics, Vol. 456. Berlin: Springer-Verlag.
- Gabriel, P. (1972). Unzerlegbare Darstellungen I. Manuscripta Math. 6:71–103.
- Gabriel, P. (1973). Indecomposable representations II. Symposia Math. Inst. Naz. Alta Mat. 11:81–104.
- Huang, Z. Y. (2006). Syzygy modules for quasi k-Gorenstein rings. J. Algebra 299:21–32.
- Iwanaga, Y., Wakamatsu, T. (1995). Auslander-Gorenstein property of triangular matrix rings. Commun. Algebra 23:3601–3614.
- Le Bruyn, L., Procesi, C. (1990). Semisimple representations of quivers. Trans. Am. Math. Soc. 317(2):585–598.
- Leszczyński, Z. (1994). On the representation type of tensor product algebras. Fund. Math. 144:143–161.
- Mitchell, B. (1972). Rings with several objects. Adv. Math. 8:1–161.
- Miyachi, J. (2000). Injective resolutions of Noetherian rings and cogenerators. Proc. Amer. Math. Soc. 128:2233–2242.
- Muller, B. J. (1968). The classification of algebras by dominant dimension. Canad. J. Math. 20:398–409.
- Nakayama, T. (1958). On algebras with complete homology. Abh. Math. Sem. Univ. Hamburg 22:300–307.