Gorenstein projective objects in functor categories
S Kvamme - Nagoya Mathematical Journal, 2020 - cambridge.org
Let $ k $ be a commutative ring, let ${\mathcal {C}} $ be a small, $ k $-linear, Hom-finite,
locally bounded category, and let ${\mathcal {B}} $ be a $ k $-linear abelian category. We …
locally bounded category, and let ${\mathcal {B}} $ be a $ k $-linear abelian category. We …
GORENSTEIN PROJECTIVE OBJECTS IN FUNCTOR CATEGORIES.
S KVAMME - Nagoya Mathematical Journal, 2020 - search.ebscohost.com
Let $ k $ be a commutative ring, let ${\mathcal {C}} $ be a small, $ k $-linear, Hom-finite,
locally bounded category, and let ${\mathcal {B}} $ be a $ k $-linear abelian category. We …
locally bounded category, and let ${\mathcal {B}} $ be a $ k $-linear abelian category. We …
Gorenstein projective objects in functor categories
S Kvamme - arXiv e-prints, 2018 - ui.adsabs.harvard.edu
Let $ k $ be a commutative ring, let $\mathcal {C} $ be a small, $ k $-linear, Hom-finite,
locally bounded category, and let $\mathcal {B} $ be a $ k $-linear abelian category. We …
locally bounded category, and let $\mathcal {B} $ be a $ k $-linear abelian category. We …
Gorenstein projective objects in functor categories
S Kvamme - arXiv preprint arXiv:1801.05493, 2018 - arxiv.org
Let $ k $ be a commutative ring, let $\mathcal {C} $ be a small, $ k $-linear, Hom-finite,
locally bounded category, and let $\mathcal {B} $ be a $ k $-linear abelian category. We …
locally bounded category, and let $\mathcal {B} $ be a $ k $-linear abelian category. We …
GORENSTEIN PROJECTIVE OBJECTS IN FUNCTOR CATEGORIES
S Kvamme - Nagoya Mathematical Journal, 2020 - search.proquest.com
Abstract Let\(k\) be a commutative ring, let\({\mathcal {C}}\) be a small,\(k\)-linear, Hom-finite,
locally bounded category, and let\({\mathcal {B}}\) be a\(k\)-linear abelian category. We …
locally bounded category, and let\({\mathcal {B}}\) be a\(k\)-linear abelian category. We …