[1] Fuller K R. Density and equivalence [J]. J Algebra, 1974, 29(3): 528-550.
[2] Angeleri Hügel L, Coelho F U. Infinitely generated tilting modules of finite projective dimension [J]. Forum Math, 2001, 13(2):239-250.
[3] Bazzoni S. A characterization of n-cotilting and n-tilting modules [J]. J Algebra, 2004, 273(1): 359-372.
[4] Colpi R. Tilting modules and *-modules [J]. Comm Algebra, 1993, 21(4): 1095-1102.
[5] Miyashita Y. Tilting modules of finite projective dimension [J]. Math Z, 1986, 193(1): 113-146.
[6] Menini C, Orsatti A. Representable equivalences between categories of modules and applications [J]. Rend Sem Mat Univ Padova, 1989, 82: 203-231.
[7] Colpi R, Menini C. On the structure of *-modules [J]. J Algebra, 1993, 158(2): 400-419.
[8] Fuller K R. *-modules over ring extensions [J]. Comm Algebra, 1997, 29(9): 2839-2860.
[9] Trlifaj J. *-modules are finitely generated [J]. J Algebra, 1994, 169(2): 392-398.
[10] Wei J, Huang Z, Tong W, et al. Tilting modules of finite projective dimension and a generalization of *-modules [J]. J Algebra, 2003, 268(2): 404-418.
[11] Colby R R, Fuller K R. Costar modules [J]. J Algebra, 2001, 242(1): 146-159.
[12] Yao L L, Chen J L. Co-*nn-modules [J]. Algebra Colloq, 2010, 17(3): 447-456.
[13] Colby R R, Fuller K R. Equivalence and duality for module categories [M]. Cambridge, UK: Cambridge University Press, 2004.
[14] Wei J. Equivalences and the tilting theory [J]. J Algebra, 2005, 283(2): 584-595.