[1] J., Asadollahi, A., Bahlekeh and Sh., Salarian, ‘On the hierarchy of cohomological dimensions of groups’, preprint 2007.

[2] M., Auslander, ‘Anneaux de Gorenstein, et torsion en alg`ebre commutative’, Secrétariat mathématique, Paris, 1967, Séminaire d'Alg`ebre Commutative dirigé par Pierre Samuel, 1966/67. Texte rédigé, d'apr`es des exposés de Maurice Auslander, par Marquerite Mangeney, Christian Peskine et Lucien Szpiro. École Normale Supérieure de Jeunes Filles.

[3] A., Bahlekeh, F., Dembegioti and O., Talelli, ‘Gorenstein dimension and proper actions’, Bull.London Math.Soc. 41 (2009), 859-871.Google Scholar

[4] D.J., Benson, J.F., Carlson, ‘Products in negative cohomology’, J. Pure Appl. Algebra 82 (1992), 107-129.Google Scholar

[5] J., Cornick and P.H., Kropholler, ‘Homological finiteness conditions for modules over group algebras’, J. London Math. Soc. 58 (1998), 19-62.Google Scholar

[6] F., Dembegioti and O., Talelli, ‘A note on complete resolutions’, to appear in the Proc. AMS.

[7] W., Dicks and M.J., Dunwoody, ‘Groups acting on graphs’, Cambridge University Press (1989).

[8] I., Emmanouil, ‘On certain cohomological invariants of groups’, Adv. Math. 225 (2010), 3446-3462.Google Scholar

[9] I., Emmanouil and O., Talelli, ‘Finiteness Criteria in Gorenstein Homological Algebra’, to appear in the Tran AMS.

[10] E.E., Enochs and O.M.G., Jenda, ‘Gorenstein injective and projective modules’, Math. Z 220 (4) (1995), 611-633.Google Scholar

[11] T.V., Gedrich and K.W., Gruenberg, ‘Complete cohomological functors on groups’, Topology and its Applications 25 (1987), 203-223.Google Scholar

[12] F., Goichot, ‘Homologie de Tate-Vogel equivariant’, J. Pure Appl. Algebra 82 (1992), 39-64.Google Scholar

[13] H., Holm, ‘Gorenstein homological dimensions’, J. Pure Appl. Algebra 189 (2004), 167-193.

[14] B.M., Ikenaga, ‘Homological dimension and Farrell cohomology’, J. Algebra 87 (1984), 422-457.Google Scholar

[15] P.H., Kropholler, ‘On groups of type FP∞’, J. Pure Appl. Algebra 90 (1993), 55-67.Google Scholar

[16] P.H., Kropholler, ‘Hierarchical decompositions, generalized Tate cohomology, and groups of type (FP)∞’, Combinatorial and Geometric Group Theory, LMS, Lecture Note Series 204.

[17] P.H., Kropholler and G., Mislin, ‘Groups acting on finite dimensional spaces with finite stabilizers’, Comment. Math. Helv. 73 (1998), 122-136.Google Scholar

[18] P.H., Kropholler and O., Talelli, ‘On a property of fundamental groups of graphs of finite groups’, J. Pure Appl. Algebra 74 (191), 57-59.

[19] I.J., Leary and B.E.A., Nucinkis, ‘Some groups of type VF’, Inventiones Math. 151 (1) (2003), 135-165.Google Scholar

[20] W., Lück, ‘The type of classifying space for a family of subgroups’, J. Pure Appl. Algebra 149, (2000), 177-203.Google Scholar

[21] C., Martinez-Perez, ‘A bound for the Bredon cohomological dimension for groups’, J.Group Theory 10 (2007), 731-747.Google Scholar

[22] G., Mislin, ‘Tate cohomology for arbitrary groups via satellites’, Topology and its Applications 56 (1994), 293-300.Google Scholar

[23] G., Mislin and O., Talelli, ‘On groups which act freely and properly on finite dimensional homotopy spheres’, in Computational and Geometric Aspects of Modern Algebra, M., Atkinson et al. (Eds.), London Math. Soc. Lecture Note Ser. 275, Cambridge Univ. Press (2000), 208-228.Google Scholar

[24] O., Talelli, ‘On groups with cdQG ≤ 1’, J. Pure Appl. Algebra 88 (1993) 245-247.CrossRefGoogle Scholar

[25] O., Talelli, ‘Periodicity in group cohomology and complete resolutions’, Bull. London Math. Soc. 37 (2005), 547-554.Google Scholar

[26] O., Talelli, ‘On groups of type Φ’, Archiv der Mathematik 89 (1) (2007) 24-32.Google Scholar

[27] O., Talelli, ‘A characterization for cohomological dimension for a big class of groups’, J.Algebra 326(2011), 238-244.Google Scholar