Literature Cited
A. A. Tuganbaev, “On quasiprojective modules,” Sib. Mat. Zh.,21, No. 3, 177–183 (1980).
K. M. Rangaswamy and N. Vanaya, “Quasiprojectives in Abelian and module categories,” Pac. J. Math.,43, No. 1, 221–238 (1972).
A. A. Tuganbaev, “The structure of modules close to being projective,” Mat. Sb.,106, No. 4, 554–565 (1978).
A. A. Tuganbaev, “Semiprojective modules,” Vestn. Mosk. Univ., Ser. Mat. Mekh., No. 5, 43–47 (1979).
S. Singh, “Quasiinjective and quasiprojective modules over hereditary noetherian prime rings,” Can. J. Math.,26, No. 5, 1173–1185 (1974).
S. Singh, “Modules over hereditary noetherian prime rings,” Can. J. Math.,27, No. 4, 867–883 (1975).
S. Singh, “Modules over hereditary noetherian prime rings. II,” Can. J. Math.,28, No. 1, 73–82 (1976).
S. Singh and S. Talwar, “Pure submodules over bounded (hnp)-rings,” Arch. Math.,30, No. 5, 570–577 (1978).
F. W. Anderson and K. R. Fuller, Rings and Categories of Modules, Springer-Verlag, New York (1974).
D. Eisenbud and P. Griffith, “Serial rings,” J. Algebra,17, No. 3, 389–400 (1971).
K. R. Fuller, “Rings of left invariant module type,” Commun. Algebra,6, No. 2, 153–167 (1978).
S. Singh, “HNP-rings over which every module admits a basic submodule,” Pac. J. Math.,76, No. 2, 509–512 (1978).
Additional information
Moscow State University, Moscow. Translated from Sibirskii Matematicheskii Zhurnal, Vol. 21, No. 5, pp. 109–113, September–October, 1980.
Rights and permissions
About this article
Cite this article
Tuganbaev, A.A. Semiprojective modules. Sib Math J 21, 725–728 (1980). https://doi.org/10.1007/BF00973889
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF00973889