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| Paper IPM / M / 91 |
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| Abstract: | ||||||
Let I be an ideal of the commutative ring R and let P be a
projective R-module. Let N (resp. A) denote a Noetherian
(resp. Artinian) R-module and N′ (resp. A′) a submodule of
N (resp. A), also let A" denote a submodule of A′. It is
shown that the two sequences of associated (resp. attached) prime
ideals AssR([(HomR(P,N))/(In HomR(P,N′))]) and AssR ( [( InHomR(P,N))/(In HomR (P,N′))]) (resp. AttR(HomR(P,A′)
: Hom_R(P,A) I^n /Hom_R (P,A") c : Hom_R(P,A) I^n)) become for large n Download TeX format |
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