References
- Assem, I., Beligiannis, A., Marmaridis, N. (1998). Right triangulated categories with right semi-equivalences. Can. Math. Soc. Conf. Proc. 24:17–37.
- Auslander, M., Reiten, I. (1991). Applications of contravariantly finite subcategories. Adv. Math. 86(1):111–152.
- Auslander, M., Solberg, ø. (1993). Relative homology and representation theory. I and II. Commun. Algebra 21(9):2995–3031 and 21(9):3033–3079.
- Beligiannis, A., Marmaridis, N. (1944). Left triangulated categories arising from contravariantly finite subcategories. Commun. Algebra 22(12):5021–5036.
- Beligiannis, A., Reiten, I. (2007). Homological and Homotopical Aspects of Torsion Theories. Memoirs Am. Math. Soc.
- Chen, X. W. (2009). Extensions of covariantly finite subcategories. Arch. Math. 93(1):29–35.
- Gentle, R., Todorov, G. (1996). Extensions, kernels and cokernels of homologically finite subcategories. Representation Theory of Algebras (Cocoyoc, 1994). CMS Conf. Proc., Vol. 18. Providence, RI: Amer. Math. Soc., pp. 227–235.
- Happel, D. (1988). Triangulated Categories in the Representation Theory of Finite Dimensional Algebras. London Mathematical Society, LMN, Vol. 119. Cambridge: Cambridge University Press.
- Happel, D., Reiten, I. I., Smalø, S. O. (1996). Tilting in abelian categories and quasitilted algebras. Memoirs Am. Math. Soc.
- Lin, Y. N., Xin, L. (2007). On one-sided torsion pair. Sci. China Ser. A: Math. 50(1):13–26.
- Liu, Y., Zhu, B. (2013). Triangulated quotient categories. Commun. Algebra 41(10):3720–3738.
- Neeman, A. (2001). Triangulated Categories. Princeton: Princeton University Press.