On f-injective modules
Archiv der Mathematik • 2002
معلومات البحث
المؤلفون
M.Zayed
الكلمات المفتاحية
Not Available
المجلة العلمية
Archiv der Mathematik
الناشر
Not Available
المجلد
78
العدد
5
الصفحات
345-349
publication.type
International
رابط البحث
Not Available
المواد المرفقة
Not Available
الملخص
In this paper, the notions of f -injective and f ∗-injective modules are indroduced.
Elementary properties of these modules are given. For instance, a ring R is coherent
iff any ultraproduct of f -injective modules is absolutaly pure.We prove that the class
∗ of f ∗-injective modules is closed under ultraproducts. On the other hand,
∗ is not
axiomatisable. For coherent rings R,
∗ is axiomatisable iff every χ0 -injective module
is f ∗-injective. Further, it is shown that the classof f -injective modules is axiomatisable
iff R is coherent and every χ0-injectivemodule is f -injective. Finally, an f -injective
module H, such that every module embeds in an ultraprower of H, is given.
Elementary properties of these modules are given. For instance, a ring R is coherent
iff any ultraproduct of f -injective modules is absolutaly pure.We prove that the class
∗ of f ∗-injective modules is closed under ultraproducts. On the other hand,
∗ is not
axiomatisable. For coherent rings R,
∗ is axiomatisable iff every χ0 -injective module
is f ∗-injective. Further, it is shown that the classof f -injective modules is axiomatisable
iff R is coherent and every χ0-injectivemodule is f -injective. Finally, an f -injective
module H, such that every module embeds in an ultraprower of H, is given.
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