C(X*)-Cover and C(X*)-Envelope
Abstract
Let R be any associative ring with unity and X be a class of R-modules of closed under direct sum (and summands) and with extension closed. We prove that every complex has an C(X*)-cover (C(X*)-envelope) if every module has an X-cover (X-envelope) where C(X*) is the class of complexes of modules in X such that it is closed under direct and inverse limit.
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