___

• Auslander M, Bridger M. Stable module theory. Mem Amer Math Soc, Vol. 94, American Mathematical Society, USA: Providence, RI, 1969.
• Avramov LL, Martsinkovsky A. Absolute, relative, and Tate cohomology of modules of finite Gorenstein dimension. Proc London Math Soc 2002; 85: 393–440.
• Bennis D, Mahdou N, Ouarghi K. Rings over which all modules are strongly Gorenstein projective. Rocky Mountain J Math 2010; 40: 749–759.
• Bennis D, Mahdou N. Strongly Gorenstein projective, injective and flat modules. J Pure Appl Algebra 2007; 210: 437–445.
• Bennis D, Mahdou N. Global Gorenstein Dimensions. Proc Amer Math Soc 2010; 138: 461–465.
• Bennis D, Mahdou N. A generalization of strongly Gorenstein projective modules. J Algbra Appl 2009; 8: 219–227.
• Christensen LW, Frankild A, Holm H. On Gorenstein projective, injective and flat dimensions-a functorial descrip- tion with applications. J Algebra 2006; 302: 231–279.
• Christensen LW. Gorenstein Dimensions. Lecture Notes in Math, Vol. 1747, Berlin, New York: Springer-Verlag, 2000.
• Enochs EE, Jenda OMG. On Gorenstein injective modules. Comm Algebra 1993; 21: 3489-3501.
• Enochs EE, Jenda OMG. Gorenstein injective and projective modules. Math Z 1995; 220: 611–633.
• Enochs EE, Jenda OMG. Relative Homological Algebra. In: de Gruyter Expositions in Math Vol. 30, Berlin, New York: Walter de Gruyter, 2000.
• Holm H. Rings with finite Gorenstein injective dimension. Proc Amer Math Soc 2004; 132: 1279–1283.
• Holm H. Gorenstein homological dimensions. J Pure Appl Algrbra 2004; 189: 167–193.
• Mahdou N, Tamekkante M. When every Gorenstein projective (resp. flat) module is strongly Gorenstein projective (resp. flat). Commun Math Appl 2010; 1: 15–25.
• Xu J. Flat Covers of Modules. Lecture Notes in Math Vol. 1634, Berlin, New York: Springer-Verlag, 1996.
• Yang XY, Liu ZK. Strongly Gorenstein projective, injective and flat modules. J Algebra 2008; 320: 2659–2674.
• Zhu XS. Resolving resolution dimensions. Algebr Represent Theor 2013; 16: 1165–1191.