عنوان
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مطالعه ی قضیه ی شرودر برنشتاین برای مدولها
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نوع پژوهش
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مقالات در همایش ها
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کلیدواژهها
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Continuous, directly finite, d-subisomorphic, Injective, Quasi-Continuous, Subisomorphic.
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چکیده
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Let R be a ring with unity. We call two R-modules M and N subisomorphic to
each other if there exist R-monomorphisms f: M \rightarrow N and g: N \rightarrow M. Analogue to Schroder-
Bernstein Theorem, the question of whether two subisomorphic modules are always isomorphic,
has been studied by several authors. In general the answer is negative. On the other hand, an
armative answer was shown for the class of (quasi-)injective modules by Bumby and for the
class of continuous modules by Muller and Rizvi. It is well known that one cannot weaken this
beyond thaking M to be quasi-continuous and N to be continuous. A related analogue question
is that of d-subisomorphic modules. We say that R-modules M and N are direct summand
subisomorphic (or d-subisomorphic for short) if there exist R-monomorphisms f: M \rightarrow N and
g: N \rightarrow M such that Imf and Img are direct summands of N and M respectively. We study
the question of when two d-subisomorphic modules are also isomorphic? We proved that if M
and N are d-subisomorphic R-modules and one of them is either quasi-continuous or directly
nite, then M and N are isomorphic. Further applications and consequences will be discused
and examples will be provided.
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پژوهشگران
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نجمه دهقانی (نفر اول)، Fatma Ebrahim Azmy (نفر دوم)، Seyed Tariq Rizvi (نفر سوم)
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