论文信息 - ABSOLUTE CO-SUPPLEMENT AND ABSOLUTE CO-COCLOSED MODULES

ABSOLUTE CO-SUPPLEMENT AND ABSOLUTE CO-COCLOSED MODULES

A module M is called an absolute co-coclosed (absolute co-supplement) module if whenever M = T=X the submodule X of T is a coclosed (supplement) submodule of T . Rings for which all modules are absolute co-coclosed (absolute co-supplement) are precisely determined. We also investigate the rings whose (nitely generated) absolute co-supplement modules are projective. We show that a commutative domain R is a Dedekind domain if and only if every submodule of an absolute co-supplement R-module is absolute co-supplement. We also prove that the class Coclosed of all short exact sequences 0 /A /B /C /0 such that A is a coclosed submodule of B is a proper class and every extension of an absolute co-coclosed module by an absolute co-coclosed module is absolute co-coclosed.

Sultan Eylem Toksoy | D. K. Tütüncü

[1] D. K. Tütüncü,et al. Supplement Submodules of Injective Modules , 2011 .

[2] Helmut Zöschinger,et al. Schwach-injektive Moduln , 2006, Period. Math. Hung..

[3] John Clark. Lifting modules : supplements and projectivity in module theory , 2006 .

[4] S. Erdo. Absolutely Supplement and Absolutely Complement Modules , 2004 .

[5] N. Vanaja,et al. MODULES FOR WHICH EVERY SUBMODULE HAS A UNIQUE COCLOSURE , 2002 .

[6] Y. Talebi,et al. The Torsion Theory Cogenerated by M-Small Modules , 2002 .

[7] D. Keskin. On lifting modules , 2000 .

[8] Tsit Yuen Lam,et al. Lectures on modules and rings , 1998 .

[9] Saad H. Mohamed,et al. Continuous and Discrete Modules , 1990 .

[10] A. Mohammed,et al. Complements in projective modules , 1989 .

[11] V. Gerasimov,et al. A counterexample to two hypotheses on projective and flat modules , 1984 .

[12] A. Generalov. The ω-Cohigh purity in a category of modules , 1983 .

[13] H. Zöschinger. Projektive Moduln mit endlich erzeugtem Radikalfaktormodul , 1981 .

[14] E. G. Sklyarenko,et al. RELATIVE HOMOLOGICAL ALGEBRA IN CATEGORIES OF MODULES , 1978 .

[15] K. Goodearl. Ring Theory: Nonsingular Rings and Modules , 1976 .

[16] A. Mišina,et al. Abelian groups and modules , 1976 .

[17] R. Warfield. Serial rings and finitely presented modules , 1975 .

[18] Frank W. Anderson,et al. Rings and Categories of Modules , 1974 .