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Gorenstein Objects in Extriangulated Categories (2011.14552v3)

Published 30 Nov 2020 in math.CT

Abstract: This paper mainly studies the relative Gorenstein objects in the extriangulated category $\mathcal{C}=(\mathcal{C},\mathbb{E},\mathfrak{s})$ with a proper class $\xi$ and the related properties of these objects. In the first part, we define the notion of the $\xi$-$\mathcal{G}$projective resolution, and study the relation between $\xi$-projective resolution and $\xi$-$\mathcal{G}$projective resolution for any object $A$ in $\mathcal{C}$, i.e. $A$ has a $\mathcal{C}(-,\mathcal{P}(\xi))$-exact $\xi$-projective resolution if and only if $A$ has a $\mathcal{C}(-,\mathcal{P}(\xi))$-exact $\xi$-$\mathcal{G}$projective resolution. In the second part, we define a particular $\xi$-Gorenstein projective object in $\mathcal{C}$ which called $\xi$-$n$-strongly $\mathcal{G}$projective object. On this basis, we study the relation between $\xi$-$m$-strongly $\mathcal{G}$projective object and $\xi$-$n$-strongly $\mathcal{G}$projective object whenever $m\neq n$, and give some equivalent characterizations of $\xi$-$n$-strongly $\mathcal{G}$projective objects. What is more, we give some nice propsitions of $\xi$-$n$-strongly $\mathcal{G}$projective objects.

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