TY - JOUR
ID - 462
TI - Gorenstein projective objects in Abelian categories
JO - Bulletin of the Iranian Mathematical Society
JA - BIMS
LA - en
SN - 1017-060X
AU - Cheng, H.
AU - Zhu, X.
AD - Department of Mathematics, Nanjing University,
Nanjing 210093, China
Y1 - 2013
PY - 2013
VL - 39
IS - 6
SP - 1079
EP - 1097
KW - $mathcal {X}$-Gorenstein projective object
KW - $mathcal {X}$-Gorenstein projective dimension
KW - $mathcal {F}$-preenvelope
KW - cotorsion pair
DO -
N2 - Let $mathcal {A}$ be an abelian category with enough projective objects and $mathcal {X}$ be a full subcategory of $mathcal {A}$. We define Gorenstein projective objects with respect to $mathcal {X}$ and $mathcal{Y}_{mathcal{X}}$, respectively, where $mathcal{Y}_{mathcal{X}}$=${ Yin Ch(mathcal {A})| Y$ is acyclic and $Z_{n}Yinmathcal{X}}$. We point out that under certain hypotheses, these two Gorensein projective objects are related in a nice way. In particular, if $mathcal {P}(mathcal {A})subseteqmathcal {X}$, we show that $Xin Ch(mathcal {A})$ is Gorenstein projective with respect to $mathcal{Y}_{mathcal{X}}$ if and only if $X^{i}$ is Gorenstein projective with respect to $mathcal {X}$ for each $i$, when $mathcal {X}$ is a self-orthogonal class or $X$ is $Hom(-,mathcal {X})$-exact. Subsequently, we consider the relationships of Gorenstein projective dimensions between them. As an application, if $mathcal {A}$ is of finite left Gorenstein projective global dimension with respect to $mathcal{X}$ and contains an injective cogenerator, then we find a new model structure on $Ch(mathcal {A})$ by Hovey's results in cite{Ho} .
UR - http://bims.iranjournals.ir/article_462.html
L1 - http://bims.iranjournals.ir/article_462_bdb19acaedd836465e241a86c9c3a04e.pdf
ER -