مشخصات پژوهش

صفحه نخست /Strongly Irreducible ...
عنوان
Strongly Irreducible Submodules In The Arithmetical And Noetherian Modules
نوع پژوهش مقاله ارائه شده
کلیدواژه‌ها
Arithmetical module, irreducible submodule, multiplication module, strongly irredusible submodules
چکیده
Let R be a commutative ring and let M be an arbitrary R-module. In this talk, we will introduce the concept of the strongly irreducible submodules of M and we will prove some properties of them, whenever M is either an arithmetical or a Noetherian module. In the case when R is Noetherian and M is nitely generated, several characterizations of strongly irre- ducible submodules are included. Among other things, it is shown that when N is a submodule of M such that N :R M is not a prime ideal, then N is strongly irreducible if and only if there exist submodule L of M and prime ideal p of R such that N is p-primary, N  L  pM and for all submodules K of M either K  N or Lp  Kp. In addition, we show that a submodule N of M is strongly irreducible if and only if N is primary, Mp is arithmetical and N = (pM)(n) for some integer n > 1, where p = Rad(N :R M) with p 62 AssRR=AnnR(M) and pM is not subset of N. As a consequence we deduce that if R is integral domain and M is torsion-free, then there exists a strongly irreducible submodule N of M such that N :R M is not prime ideal if and only if there is a prime ideal p of R with pM is not subset of N and Mp is an arithmetical Rp-module.
پژوهشگران منیره صدقی (نفر اول)