The notion of D-mutation pairs of subcategories in an n-exangulated category is defined in this article.When(Z,Z)is a P-mutation pair in an n-exangulated category(C,E,s),the quotient category Z/Dcarries naturally an(n...The notion of D-mutation pairs of subcategories in an n-exangulated category is defined in this article.When(Z,Z)is a P-mutation pair in an n-exangulated category(C,E,s),the quotient category Z/Dcarries naturally an(n+2)-angulated structure.This result generalizes a theorem of Zhou and Zhu for extriangulated categories.展开更多
Let A be a finite dimensional algebra over a field k. We consider a subfunc- tor F of Ext1A(-, -), which has enough projectives and injectives such that P(F) is of finite type, where P(F) denotes the set of F-pr...Let A be a finite dimensional algebra over a field k. We consider a subfunc- tor F of Ext1A(-, -), which has enough projectives and injectives such that P(F) is of finite type, where P(F) denotes the set of F-projectives. One can get the relative derived category Db(A) of A-rood. For an F-self-orthogonal module TF, we discuss the relation between the relative quotient triangulated category Db(A)/Kb(addTF) and the relative stable category of the Frobenius category of TF-Cohen-Macaulay modules. In particular, for an F-Gorenstein algebra A and an F-tilting A-module TF, we get a triangle equiva- lence between DbF(A)/Kb(add TF) and the relative stable category of TF-Cohen-Macaulay modules. This gives the relative version of a result of Chen and Zhang.展开更多
In this paper, we offer a graded equivalence between the quotient categories defined by any graded Morita-Takeuchi context via certain modifications of the graded cotensor functors. As a consequence, we show a commuta...In this paper, we offer a graded equivalence between the quotient categories defined by any graded Morita-Takeuchi context via certain modifications of the graded cotensor functors. As a consequence, we show a commutative diagram that establish the relation between the closed objects of the categories gr^c and M^C, where C is a graded coalgebra.展开更多
基金Supported by the National Natural Science Foundation of China(Grant No.11771212)a project funded by the Priority Academic Program Development of Jiangsu Higher Education Institutions.
文摘The notion of D-mutation pairs of subcategories in an n-exangulated category is defined in this article.When(Z,Z)is a P-mutation pair in an n-exangulated category(C,E,s),the quotient category Z/Dcarries naturally an(n+2)-angulated structure.This result generalizes a theorem of Zhou and Zhu for extriangulated categories.
文摘Let A be a finite dimensional algebra over a field k. We consider a subfunc- tor F of Ext1A(-, -), which has enough projectives and injectives such that P(F) is of finite type, where P(F) denotes the set of F-projectives. One can get the relative derived category Db(A) of A-rood. For an F-self-orthogonal module TF, we discuss the relation between the relative quotient triangulated category Db(A)/Kb(addTF) and the relative stable category of the Frobenius category of TF-Cohen-Macaulay modules. In particular, for an F-Gorenstein algebra A and an F-tilting A-module TF, we get a triangle equiva- lence between DbF(A)/Kb(add TF) and the relative stable category of TF-Cohen-Macaulay modules. This gives the relative version of a result of Chen and Zhang.
文摘In this paper, we offer a graded equivalence between the quotient categories defined by any graded Morita-Takeuchi context via certain modifications of the graded cotensor functors. As a consequence, we show a commutative diagram that establish the relation between the closed objects of the categories gr^c and M^C, where C is a graded coalgebra.