Let A be an Artinian algebra and F an additive subbifunctor of Ext,(-, -) having enough projectives and injectives. We prove that the dualizing subvarieties of mod A closed under F-extensions have F-almost split seq...Let A be an Artinian algebra and F an additive subbifunctor of Ext,(-, -) having enough projectives and injectives. We prove that the dualizing subvarieties of mod A closed under F-extensions have F-almost split sequences. Let T be an F-cotilting module in mod A and S a cotilting module over F = End(T). Then Horn(-, T) induces a duality between F-almost split sequences in ⊥FT and almost sl31it sequences in ⊥S, where addrS = Hom∧(f(F), T). Let A be an F-Gorenstein algebra, T a strong F-cotilting module and 0→A→B→C→0 and F-almost split sequence in ⊥FT.If the injective dimension of S as a Г-module is equal to d, then C≌(ΩCM^-dΩ^dDTrA^*)^*,where(-)^*=Hom(g,T).In addition, if the F-injective dimension of A is equal to d, then A≌ΩMF^-dDΩFop^-d TrC≌ΩCMF^-d ≌F^d DTrC.展开更多
The paper presents simple proofs of the Cauchy-Schwartz inequality and the negative discriminant property in archimedean almost f-algebras^[5], based on a sequence approximation.
In this article, we introduce a new type of contraction named almost type α-F-Z-weak contraction, which comes from a combination of F-contraction, Z-contraction, and almost contraction, and then we provide sufficient...In this article, we introduce a new type of contraction named almost type α-F-Z-weak contraction, which comes from a combination of F-contraction, Z-contraction, and almost contraction, and then we provide sufficient conditions for the existence and uniqueness of fixed point of such contractions in complete metric spaces and give some related fixed point results. In addition, some related fixed point results can derive from our main results.展开更多
In this paper, We investigate the almost periodic systems (1)and(2) where g(t,x) ∈H(f). By using the inherited property of Liapunov function, under the suitable conditions, we prove that the bounded solution of (1 ) ...In this paper, We investigate the almost periodic systems (1)and(2) where g(t,x) ∈H(f). By using the inherited property of Liapunov function, under the suitable conditions, we prove that the bounded solution of (1 ) and (2) are stable under disturbances from H(f) with respect to the compact set. From this, we obtain some theorems of the existence of the almost periodic solutions for systems (1) and (2).展开更多
It is well known that every prime ideal minimal over a z-ideal is also a z-ideal. The converse is also well known in C(X). Thus whenever I is an ideal in C(X), then √I is a z-ideal if and only if I is, in which c...It is well known that every prime ideal minimal over a z-ideal is also a z-ideal. The converse is also well known in C(X). Thus whenever I is an ideal in C(X), then √I is a z-ideal if and only if I is, in which case √I = I. We show the same fact for z^-ideals and then it turns out that the sum of a primary ideal and a z-ideal (z^o-ideal) in C(X) which are not in a chain is a prime z-ideal (z^o-ideal). We also show that every decomposable z-ideal (z^o-ideal) in C(X) is the intersection of a finite number of prime z-ideals (z^o-ideal). Some counter-examples in general rings and some characterizations for the largest (smallest) z-ideal and z^o-ideal contained in (containing) an ideal are given.展开更多
基金Partially supported by the Specialized Research Fund for the Doctoral Program of Higher Education (Grant No. 20060284002)National Natural Science Foundation of China (Grant No. 10771095)National Natural Science Foundation of Jiangsu Province of China (Grant No. BK2007517)
文摘Let A be an Artinian algebra and F an additive subbifunctor of Ext,(-, -) having enough projectives and injectives. We prove that the dualizing subvarieties of mod A closed under F-extensions have F-almost split sequences. Let T be an F-cotilting module in mod A and S a cotilting module over F = End(T). Then Horn(-, T) induces a duality between F-almost split sequences in ⊥FT and almost sl31it sequences in ⊥S, where addrS = Hom∧(f(F), T). Let A be an F-Gorenstein algebra, T a strong F-cotilting module and 0→A→B→C→0 and F-almost split sequence in ⊥FT.If the injective dimension of S as a Г-module is equal to d, then C≌(ΩCM^-dΩ^dDTrA^*)^*,where(-)^*=Hom(g,T).In addition, if the F-injective dimension of A is equal to d, then A≌ΩMF^-dDΩFop^-d TrC≌ΩCMF^-d ≌F^d DTrC.
文摘The paper presents simple proofs of the Cauchy-Schwartz inequality and the negative discriminant property in archimedean almost f-algebras^[5], based on a sequence approximation.
文摘In this article, we introduce a new type of contraction named almost type α-F-Z-weak contraction, which comes from a combination of F-contraction, Z-contraction, and almost contraction, and then we provide sufficient conditions for the existence and uniqueness of fixed point of such contractions in complete metric spaces and give some related fixed point results. In addition, some related fixed point results can derive from our main results.
文摘In this paper, We investigate the almost periodic systems (1)and(2) where g(t,x) ∈H(f). By using the inherited property of Liapunov function, under the suitable conditions, we prove that the bounded solution of (1 ) and (2) are stable under disturbances from H(f) with respect to the compact set. From this, we obtain some theorems of the existence of the almost periodic solutions for systems (1) and (2).
基金Institute for Studies in Theoretical Physics and Mathematics(IPM),Tehran
文摘It is well known that every prime ideal minimal over a z-ideal is also a z-ideal. The converse is also well known in C(X). Thus whenever I is an ideal in C(X), then √I is a z-ideal if and only if I is, in which case √I = I. We show the same fact for z^-ideals and then it turns out that the sum of a primary ideal and a z-ideal (z^o-ideal) in C(X) which are not in a chain is a prime z-ideal (z^o-ideal). We also show that every decomposable z-ideal (z^o-ideal) in C(X) is the intersection of a finite number of prime z-ideals (z^o-ideal). Some counter-examples in general rings and some characterizations for the largest (smallest) z-ideal and z^o-ideal contained in (containing) an ideal are given.
