论文信息 - Proper resolutions and Gorensteinness in extriangulated categories

Proper resolutions and Gorensteinness in extriangulated categories

Let $(\mathcal{C},\mathbb{E},\mathfrak{s})$ be an extriangulated category with a proper class $\xi$ of $\mathbb{E}$-triangles, and $\mathcal{W}$ an additive full subcategory of $\mathcal C$. We provide a method for constructing a proper $\mathcal{W}(\xi)$-resolution (respectively, coproper $\mathcal{W}(\xi)$-coresolution) of one term in an $\mathbb{E}$-triangle in $\xi$ from that of the other two terms. By using this way, we establish the stability of the Gorenstein category $\mathcal{GW}(\xi)$ in extriangulated categories. These results generalise their work by Huang and Yang-Wang, but the proof is not too far from their case. Finally, we give some applications about our main results.

[1] Zhicheng Wang,et al. Proper resolutions and Gorensteinness in triangulated categories , 2017 .

[2] Jiangsheng Hu,et al. Proper classes and Gorensteinness in extriangulated categories , 2019, Journal of Algebra.

[3] Panyue Zhou,et al. Triangulated quotient categories revisited , 2016, 1608.00297.

[4] S. Sather-Wagstaff,et al. Stability of Gorenstein categories , 2007, math/0703644.

[5] Zhanping Wang,et al. Stability of Gorenstein objects in triangulated categories , 2014, 1409.7274.

[6] X. Yang. Notes on proper class of triangles , 2013 .

[7] Xiaoyan Yang. MODEL STRUCTURES ON TRIANGULATED CATEGORIES , 2014, Glasgow Mathematical Journal.

[8] Zhaoyong Huang. Proper Resolutions and Gorenstein Categories , 2012, 1203.4110.

[9] Apostolos Beligiannis. Relative Homological Algebra and Purity in Triangulated Categories , 2000 .

[10] Zhongkui Liu,et al. Gorenstein homological dimensions for triangulated categories , 2014 .

[11] Yann Palu,et al. Extriangulated categories, Hovey twin cotorsion pairs and model structures , 2019 .