AbstractWe study a generalization of tilting modules to modules of possibly infinite projective dimension, introduced by Wakamatsu in [J. Algebra 114 (1988) 106–114]. In particular, we characterize these modules in terms of suitable subcategories of finitely generated modules and in terms of cotorsion theories
We show that, over an artin algebra, the tilting functor preserves (co)tilting modules in the subcat...
Let Λ be a finite dimensional, connected, associative algebra with unit over a field k. Let n be the...
We prove that every tilting module of projective dimension at most one is of finite type, namely tha...
We study a generalization of tilting modules to modules of possibly infinite projective dimension, i...
AbstractWe study a generalization of tilting modules to modules of possibly infinite projective dime...
The theory for tilting and cotilting modules has its roots in the representation theory of nite dime...
We extend Miyashita's notion of a tilting module of finite projective dimension to infinitely genera...
AbstractIt is well known that tilting modules of projective dimension ⩽ 1 coincide with ∗-modules ge...
AbstractWe study a natural generalization of *n-modules (and hence also of *-modules) by introducing...
Infinite dimensional tilting modules are abundant in representation theory. They occur when studying...
We apply tilting theory to study modules of finite projective dimension. We introduce the notion of ...
We prove that any infinitely generated tilting module is of finite type, namely that its associated ...
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...
AbstractLet R be a left noetherian ring, S a right noetherian ring and UR a generalized tilting modu...
We show that, over an artin algebra, the tilting functor preserves (co)tilting modules in the subcat...
Let Λ be a finite dimensional, connected, associative algebra with unit over a field k. Let n be the...
We prove that every tilting module of projective dimension at most one is of finite type, namely tha...
We study a generalization of tilting modules to modules of possibly infinite projective dimension, i...
AbstractWe study a generalization of tilting modules to modules of possibly infinite projective dime...
The theory for tilting and cotilting modules has its roots in the representation theory of nite dime...
We extend Miyashita's notion of a tilting module of finite projective dimension to infinitely genera...
AbstractIt is well known that tilting modules of projective dimension ⩽ 1 coincide with ∗-modules ge...
AbstractWe study a natural generalization of *n-modules (and hence also of *-modules) by introducing...
Infinite dimensional tilting modules are abundant in representation theory. They occur when studying...
We apply tilting theory to study modules of finite projective dimension. We introduce the notion of ...
We prove that any infinitely generated tilting module is of finite type, namely that its associated ...
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...
AbstractLet R be a left noetherian ring, S a right noetherian ring and UR a generalized tilting modu...
We show that, over an artin algebra, the tilting functor preserves (co)tilting modules in the subcat...
Let Λ be a finite dimensional, connected, associative algebra with unit over a field k. Let n be the...
We prove that every tilting module of projective dimension at most one is of finite type, namely tha...
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