مدول های گلدی مکمل پذیر در ارتباط با پیش رادیکال

نویسنده
چکیده


فرض کنید τ یک پیش رادیکال باشد. در این مقاله رابطه βτ* روی زیرمدول های یک مدول را تعریف و بررسی می کنیم. نشان می دهیم که رابطه βτ* یک رابطه هم ارزی است. این رابطه را برای تعریف مدول های گلدی τ-مکمل پذیر و مدول های به طور قوی τ -H مکمل پذیر و بررسی ویژگی های آنها بکار می بریم.
کلیدواژه‌ها

عنوان مقاله English

Goldie supplemented modules with respect to a preradical

نویسنده English

Tayyebeh Amouzegar
چکیده English

Introduction

Throughout this paper R will denote an associative ring with identity, M a unitary

right R-module. A functor τfrom the category of the right R-modules Mod-R to itself is called a preradicalif it satisfies the following properties:

(i) τ(M)is a submodule of M, for every R-module M;

(ii) If f:M'→Mis an R-module homomorphism, then f(τM'≤τM and τ(f) is the restriction of fto τM'.

For example Rad, Soc, and ZMare preradicals. Note that if K is a summand of M,

then K∩τ(M)=τ(K).

For a preradical τ, Al-Takhman, Lomp and Wisbauer defined and studied the concept of τ-lifting and τ-supplemented modules. A module M is called τ-lifting if every submodule N of M has a decomposition N =A⊕ B such that A is a direct summand of M and B⊆τ(M).A submodule K⊆ M is called τ-supplement (weak

τ-supplement) provided there exists some U⊆ Msuch thatM=U+K and

U∩ K⊆τ(K) (U∩ K⊆τ(M)).

M is called τ-supplemented (weakly τ-supplemented) if each of its submodules

τ-supplement (weak τ-supplement) in M.Talebi, Moniri Hamzekolaei and Keskin-Tütüncü, defined τ-H-supplemented modules. A module M is calledτ-H-supplemented if for every N≤ M there exists a direct summand D of Msuch that

(N+D)/N ⊆τ(M/N)and(N+D)/D⊆τ(M/D).

The β* relation is introduced and investigated by Birkenmeier, Takil Mutlu, Nebiyev, Sokmez and Tercan. Let X and Y be submodules of M. X and Yare β* equivalent,

Xβ*Y, provided X+YXMX andX+YYMY.

Based on definition of β* relation they introduced two new classes of modules namely

Goldie*-lifting and Goldie*-supplemented.They showed that two concept of

H-supplemented modules and Goldie*-lifting modules coincide.

In this paper, we introduce Goldie-τ-supplemented and strongly τ-H-supplemented modules. We introduce the β* relation. We investigate some properties of this relation and prove that this relation is an equivalence relation. We define Goldie-τ-supplemented and strongly τ-H-supplemented modules. We call a module M, Goldie-τ-supplemented (strongly τ-H-supplemented) if for any submodule N of M,there exists a τ-supplement submodule (a direct summand) D of M such thatNβ*D. Clearly every strongly τ-H-supplemented module is Goldie τ -supplemented. We will study direct sums of Goldie τ -H-supplemented modules. Let M = A⊕ B be a distributive module. Then M is Goldie τ -upplemented(strongly τ -H-supplemented) if and only if A and B are Goldie τ -supplemented(strongly τ -H-supplemented. We also define τ -H-cofinitely supplemented modules and obtain some conditions which under the factor module of a τ -H-cofinitely supplemented module will be τ -H-cofinitely supplemented.

Material and methods

In this paper, first we define and investigate the βτ* relation on submodules of a module. We show that the βτ*relation is an equivalence relation. We apply this relation to define and investigate the classes of Goldie-τ -supplemented modules and stronglyτ-H-supplemented modules.

Results and discussion

We investigate some properties of this relation and prove that this relation is an equivalence relation. We define Goldie-τ-supplemented and strongly τ-H- supplemented modules. We call a module M, Goldie-τ-supplemented (strongly τ -H-supplemented) if for any submodule N of M, there exists a τ-supplement submodule (a direct summand) D of M such that Nβ* D. Clearly every strongly τ -H-supplemented module is Goldie τ -supplemented. We will study direct sums of Goldie τ -H-supplemented modules. Let M = A⊕ B be a distributive module. Then M is Goldie τ -upplemented (strongly τ -H-supplemented) if and only if A and B are Goldie τ -supplemented (strongly τ -H-supplemented). We also define τ -H-cofinitely supplemented modules and obtain some conditions which under the factor module of a τ -H-cofinitely supplemented module will be τ -H-cofinitely supplemented.

Conclusion

The following conclusions were drawn from this research.

Let M = M1M2, where M1 is a fully invariant submodule of M. Assume that τ is a cohereditary preradical. If M is strongly τ-H-supplemented, then M1 and M2 are strongly τ-H-supplemented.




Let M be an τ-H-cofinitely supplemented module and let N≤ M be a submodule. Suppose that for every direct summand K of M, there exists a submodule L of M such that N⊆ L⊆ K+N, L/N is a direct summand of M/N andK+NNL/NτMN+LNL/N. Then M/N is τ-H-cofinitelysupplemented.




Let M be a module and let N≤ M be a submodule such that for each decomposition M = M1M2 we have N = N∩ M1⊕ (N∩ M2). If M is τ-H-cofinitely supplemented, then M/N is τ-H-cofinitely supplemented.

کلیدواژه‌ها English

H-supplemented module
strongly τ -H-supplemented module
Goldie- τ -supplemented module
[1] Alkan M., On τ-lifting Modules and τ-semiperfect Modules, Turk. J. Math., 33 (2009), 117–130.

[2] Al-Takhman K., Lomp C. and Wisbaure R., τ-complemented and τ-upplemented modules, Algebra Discrete Math., 3 (2006), 1-15.

[3] Birkenmeier G. F., Takil Mutlu F., Nebiyev C., Sokmez N. and Tercan A., Goldie ^*-supplemented modules, Glasg. Math. J., 52A (2010), 41–52.

[4] Clark J., Lomp C., Vanaja N. and Wisbauer R., Lifting modules -supplements and projectivity in module theory, Frontiers in Mathematics, Birkhäuser, 2006.

[5] Keskin D., Nematollahi M. J. and Talebi Y., On H-supplemented modules, Algebra Colloq., 18 (Spec 1) (2011), 915-924.

[6] Koşan M. T. and Keskin D., H-supplemented duo modules, J. Algebra Appl. 6(6) (2007), 965-971.

[7] Mohamed S. H. and Müller B. J., Continuous and Discrete Modules, London Math. Soc. Lecture Notes Series 147, Cambridge, University Press, 1990.

[8] Talebi Y., Tribak R. and Moniri Hamzekolaei A. R., On H-Cofinitely supplemented Modules, Bull. Iran. Math. Soc., 39 (2) (2013), 325-346.

[9] Talebi Y., Moniri Hamzekolaei A. R. and Keskin-Tütüncü D., H-supplemented modules with respect to a preradical, Algebra Discrete Math., 12 (1) (2011), 116–131.

[10] Talebi Y., Moniri Hamzekolaei A. R. and Tercan A., Goldie-Rad-supplemented modules, An. Şt. Univ. Ovidius Constanţa, 22(3) (2014), 205–218.

[11] Warfield R.B., Jr., Decomposability of finitely presented modules, Proc. Amer. Math. Soc., 25 (1970) 167-172.

[12] Wisbauer R., Foundations of module and ring theory, Gordon and Breach, Reading, 1991.