[1] Abazari N., Bahmanpour K., “Extension functors of local cohomology modules and Serre category of modules”, Taiwan. J. Math., 19 (2015), 211-220.
[2] Aghapournahr M., Behrouzian M., “Cofiniteness properties of generalized local cohomology modules”, To appear in Bull. Belgian Math. Soc.
[3] Asadollahi D., Naghipour R., “Faltings’ local-global principle for the finiteness of local cohomology modules”, Commun. Algebra, 43 (2015), 953-958.
[4] Bahmanpour K., “On the category of weakly laskerian cofinite modules”, Math. Scand., 115 (2014), 62-68.
[5] Bahmanpour K., Naghipour R., “On the cofiniteness of local cohomlogy modules”, Proc. Amer. Math. Soc., 136 (2008), 2359-2363.
[6] Bahmanpour K., Naghipour R., “Associated primes of local cohomology modules and Matlis duality”, J. Algebra, 320 (2008), 2632-2641.
[7] Bahmanpour K., Naghipour R., “Cofiniteness of local cohomology modules for ideals of small dimension”, J. Algebra, 321 (2009), 1997-2011.
[8] Bahmanpour K., Naghipour R., Sedghi M., “Minimaxness and cofiniteness properties of local cohomology modules”, Commun. Algebra, 41 (2013), 2799-2814.
[9] Brodmann M. P., Lashgari F. A., “A finiteness result for associated primes of local cohomology modules”, Proc. Amer. Math. Soc., 128 (2000), 2851-2853.
[10] Brodmann M. P., Sharp R. Y., “Local Cohomology: An Algebraic Introduction with Geometric Applications”, Cambridge University Press, Cambridge (1998).
[11] Chiriacescu G., “Cofiniteness of local cohomology modules over regular local rings”, Bull. London Math. Soc., 32 (2000), 1-7.
[12] Delfino D., “On the cofiniteness of local cohomology moduls”, Math. Proc. Camb. Phil. Soc., 115 (1994), 79-84.
[13] Delfino D., Marley T., “Cofinite modules and local cohomology”, J. Pure and Appl. Algebra, 121 (1997), 45-52.
[14] Grothendieck A., “Notes by R. Hartshorne, Lecture Notes in Math”, 862 (Springer, New York, 1966).
[15] Grothendieck A., “Cohomologie Locale des Faisceaux Coherents et Theoremes de Lefschetz Locaux et Globaux (SGA 2)”, North-Holland Pub. Co., Amsterdam (1968).
[16] Hartshorne R., “Affine duality and cofiniteness”, Invent. Math., 9 (1970), 145-164.
[17] Herzog J., “Komplexe, Auflosungen und Dualitat in der Lokalen Algebra”, Habilitationsschrift, Universitat Regensburg, Regensburg (1970).
[18] Hoang N. V., “On Faltings’ local-global principle of generalized local cohomology modules”, Kodai Math. J., 40 (2017), 58-62.
[19] Hoang N. V., Ngoan N. T., “On the cofiniteness of small-level generalized local cohomology modules”, Bull. Iranian Math. Soc.,46 (2020), 725-736.
[20] Huneke C., Koh J., “Cofiniteness and vanishing of local cohomology modules”, Math. Proc. Camb. Phil. Soc., 110 (1991), 421-429.
[21] Hung Quy, P., “On the finiteness of associated primes of local cohomology modules”, Proc. Amer. Math. Soc., in press.
[22] Kawasaki K. I., “On the finiteness of Bass numbers of local cohomology modules”, Proc. Amer. Math. Soc., 124 (1996), 3275-3279.
[23] Marley T., Vassilev J. C., “Cofiniteness and associated primes of local cohomology modules”, J. Algebra, 256 (2002), 180-193.
[24] Matsumura H., “Commutative ring theory”, Cambridge Univ. Press, Cambridge, UK, 1986.
[25] Yoshida K. I., “Cofiniteness of local cohomology modules for ideals of dimension one”, Nagoya Math. J., 147 (1997), 179-191.
[26] Vahidi A., Hassani F., Hoseinzade E., “Extension functors of generalized local cohomology modules”, arXiv:1810.10217v1 [math.AC] 24 Oct 2018.
[27] Yassemi S., “Cofinite modules”, Commun. Algebra, 6 (2001), 2333-2340.