English

$C(\mathcal{X^{*}})$-Cover and $C(\mathcal{X^{*}})$-Envelope

Rings and Algebras 2016-08-14 v1

Abstract

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

Keywords

Cite

@article{arxiv.1103.2200,
  title  = {$C(\mathcal{X^{*}})$-Cover and $C(\mathcal{X^{*}})$-Envelope},
  author = {Tahire Özen and Emine Yıldırım},
  journal= {arXiv preprint arXiv:1103.2200},
  year   = {2016}
}
R2 v1 2026-06-21T17:38:12.264Z