Higher differential objects are investigated and used for addressing three gen-eral problems.Torsionless differential modules over path algebras are characterized.The adjoint triples between triangulated categories,in...Higher differential objects are investigated and used for addressing three gen-eral problems.Torsionless differential modules over path algebras are characterized.The adjoint triples between triangulated categories,involving derived categories and singularity categories,are allowed to be constructed from those between the abelian categories C and C[ε]^(n).The partial silting properties between an abelian category C and C[ε]^(n)are trans-ferred,and if moreover,C is Frobenius,the partial silting objects of the stable monomor-phism categories of C[ε]^(n)are constructed from those of C.展开更多
Let R be a right coherent ring and D^b(R-Mod) the bounded derived category of left R-modules. Denote by D^b(R-Mod)[GF,C] the subcategory of D^b(R-Mod) consisting of all complexes with both finite Gorenstein flat...Let R be a right coherent ring and D^b(R-Mod) the bounded derived category of left R-modules. Denote by D^b(R-Mod)[GF,C] the subcategory of D^b(R-Mod) consisting of all complexes with both finite Gorenstein flat dimension and cotorsion dimension and K^b(F∩C) the bounded homotopy category of flat cotorsion left R-modules. We prove that the quotient triangulated category D^b(R-Mod)[GF,C]/K^b(F∩C,) is triangle-equivalent to the stable category GF∩C of the Frobenius category of all Gorenstein fiat and cotorsion left R-modules.展开更多
基金Supported by the National Natural Science Foundation of China(Grant No.11771272)。
文摘Higher differential objects are investigated and used for addressing three gen-eral problems.Torsionless differential modules over path algebras are characterized.The adjoint triples between triangulated categories,involving derived categories and singularity categories,are allowed to be constructed from those between the abelian categories C and C[ε]^(n).The partial silting properties between an abelian category C and C[ε]^(n)are trans-ferred,and if moreover,C is Frobenius,the partial silting objects of the stable monomor-phism categories of C[ε]^(n)are constructed from those of C.
基金Supported by National Natural Science Foundation of China(Grant Nos.11601433 and 11261050)the Postdoctoral Science Foundation of China(Grant No.2106M602945XB)Northwest Normal University(Grant No.NWNU-LKQN-15-12)
文摘Let R be a right coherent ring and D^b(R-Mod) the bounded derived category of left R-modules. Denote by D^b(R-Mod)[GF,C] the subcategory of D^b(R-Mod) consisting of all complexes with both finite Gorenstein flat dimension and cotorsion dimension and K^b(F∩C) the bounded homotopy category of flat cotorsion left R-modules. We prove that the quotient triangulated category D^b(R-Mod)[GF,C]/K^b(F∩C,) is triangle-equivalent to the stable category GF∩C of the Frobenius category of all Gorenstein fiat and cotorsion left R-modules.
