References
- Bass, H. (1962). Injective dimension in Noetherian rings. Trans. Amer. Math. Soc. 102(1):18–29.
- Bennis, D. (2011). A note on Gorenstein flat dimension. Algebra Colloq. 18(1):155–161.
- Costa, D. L. (1994). Parameterizing families of non-Noetherian rings. Commun. Algebra 22(10):3997–4011.
- Ding, N. Q., Chen, J. L. (1996). Coherent rings with finite self-FP-injective dimension. Commun. Algebra 24(9):2963–2980.
- Enochs, E., Jenda, O. (1995). Gorenstein injective and projective modules. Math. Z. 220(1):611–633.
- Enochs, E., Jenda, O., Torrecillas, B. (1993). Gorenstein flat modules. Nanjing Daxue Xuebao Shuxue Bannian Kan 10:1–9.
- Gao, Z. H., Wang, F. G. (2014). All Gorenstein hereditary rings are coherent. J. Algebra Appl. 13(4):1350140.
- Gao, Z. H., Wang, F. G. (2015). Weak injective and weak flat modules. Commun. Algebra 43(9):3857–3868.
- Holm, H. (2004). Gorenstein homological dimensions. J. Prue Appl. Algebra 189(1–3):167–193.
- Hu, K., Wang, F., Xu, L. (2016). A note on Gorenstein Prüfer domains. Bull. Korean Math. Soc. 53(5):1447–1455.
- Qiao, L., Wang, F. G. (2015). A Gorenstein analogue of a result of Bertin. J. Algebra Appl. 14(2):1550019.
- Rotman, J. J. (2009). An Introduction to Homological Algebra, 2nd ed. New York: Springer Science + Business Media, LLC.
- Stenström, B. (1970). Coherent rings and FP-injective modules. J. London. Math. Soc. s2-2(2):323–329.
- Wang, F. G., Kim, H. (2016). Foundations of Commutative Rings and Their Modules. Singapore: Springer Nature Singapore Pte Ltd.
- Wang, F. G., Qiao, L., Kim, H. (2016). Super finitely presented modules and Gorenstein projective modules. Commun. Algebra 44(9):4056–4072.
- Xing, S. Q., Wang, F. G. (to appear). The rings in which all super finitely presented modules are Gorenstein projective. Bull. Malays. Math. Sci. Soc. DOI:10.1007/s40840-017-0527-3
- Xu, L. Y., Hu, K., Wang, F. G., Zhao, S. Q. (2016). A characterization of Prüfer domains. Commun. Algebra 44(1):135–140.