Study of Subhomomorphic Property to a Ring
Abstract
Let
M and N be two non-zero right R-modules, M is called subhomomorphic to N in case there exist R−homomorphisms f: M ! N, g : N ! M such that gof is non-zero, and M is called strongly subhomomorphic to N in case there exist homomorphisms f :M! N, g : N ! M such that both fog and gof are non-zero. After establishing some basic properties of (strongly) subhomomorphic to a ring, it is shown that for a nonsingular ring R the class of injective right R -modules are subhomomorphic to R if and only if R is a semisimple ring.
Keywords
-prime, prime, semiprime, strongly subho momorphic,
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