Add to ORKGLet A be an Artin algebra. Following Miyashita, a pair (C,T) in A-mod is called tilting provided both C and T are selforthogonal such that T ∈ ˆaddAC and C ∈ ˇaddA T. In this note, we extend a simple, beautiful characterization of tilting modules given by Bazzoni to tilting pairs in the case of Artin algebras. © 2007 Elsevier Inc. All rights reserved
AbstractWe generalize the tilting process by Happel, Reiten and Smalø to the setting of finitely pre...
Let Λ be a finite dimensional, connected, associative algebra with unit over a field k. Let n be the...
We discuss the existence of tilting modules which are direct limits of finitely generated tilting mo...
AbstractLet A be an Artin algebra. Following Miyashita, a pair (C,T) in A-mod is called tilting prov...
AbstractLet A be an Artin algebra. Following Miyashita, a pair (C,T) in A-mod is called tilting prov...
Communicated by I. Reiten Let A be an Artin algebra. A pair (C, T) of A-modules is tilting provided ...
AbstractLet A be an Artin algebra. A pair (C,T) of A-modules is tilting provided that C and T are (f...
AbstractLet A be an Artin algebra. A pair (C,T) of A-modules is tilting provided that C and T are (f...
AbstractLet A be an artin algebra and e∈A an idempotent with add(eAA)=add(D(AAe)). Then a projective...
The theory for tilting and cotilting modules has its roots in the representation theory of nite dime...
In this paper, firstly, we mainly study the relationship of balanced pairs among three Abelian categ...
AbstractWe generalize basic results about classical tilting modules and partial tilting modules to t...
We generalize basic results about classical tilting modules and partial tilting modules to the infin...
AbstractThe notion of (generalized) tilting modules is introduced over arbitrary rings. It is shown ...
We discuss the existence of tilting modules which are direct limits of finitely generated tilting mo...
AbstractWe generalize the tilting process by Happel, Reiten and Smalø to the setting of finitely pre...
Let Λ be a finite dimensional, connected, associative algebra with unit over a field k. Let n be the...
We discuss the existence of tilting modules which are direct limits of finitely generated tilting mo...
AbstractLet A be an Artin algebra. Following Miyashita, a pair (C,T) in A-mod is called tilting prov...
AbstractLet A be an Artin algebra. Following Miyashita, a pair (C,T) in A-mod is called tilting prov...
Communicated by I. Reiten Let A be an Artin algebra. A pair (C, T) of A-modules is tilting provided ...
AbstractLet A be an Artin algebra. A pair (C,T) of A-modules is tilting provided that C and T are (f...
AbstractLet A be an Artin algebra. A pair (C,T) of A-modules is tilting provided that C and T are (f...
AbstractLet A be an artin algebra and e∈A an idempotent with add(eAA)=add(D(AAe)). Then a projective...
The theory for tilting and cotilting modules has its roots in the representation theory of nite dime...
In this paper, firstly, we mainly study the relationship of balanced pairs among three Abelian categ...
AbstractWe generalize basic results about classical tilting modules and partial tilting modules to t...
We generalize basic results about classical tilting modules and partial tilting modules to the infin...
AbstractThe notion of (generalized) tilting modules is introduced over arbitrary rings. It is shown ...
We discuss the existence of tilting modules which are direct limits of finitely generated tilting mo...
AbstractWe generalize the tilting process by Happel, Reiten and Smalø to the setting of finitely pre...
Let Λ be a finite dimensional, connected, associative algebra with unit over a field k. Let n be the...
We discuss the existence of tilting modules which are direct limits of finitely generated tilting mo...