Add to ORKGWev describe some resuilts of combinatorial type on Tilting Theory, concerning both "discrete" objects (that is modules, bimodules, and more or less short complexes) and "continuous" objects (that is oorthogonal classes and classes of modules generated or cogenerated in a special way)
We describe a sufficient condition which explains the aboundance of many rather small, and not neces...
We apply tilting theory to study modules of finite projective dimension. We introduce the notion of ...
Abstract. Tilting modules arose from representation theory of algebras and are known to furnish equi...
We investigate the relationship between several classes of modules generated or cogenerated in a rat...
We investigate bounded complexes T , with projective components, corresponding to partial tilting m...
We prove that every tilting module of projective dimension at most one is of finite type, namely tha...
We investigate reasonably large partial tilting or cotilting modules, obtained after the cancellatio...
We prove that any infinitely generated tilting module is of finite type, namely that its associated ...
We investigate tilting - type modules, regarded as bounded complexes of projective modules, and smal...
An important result in tilting theory states that a class of modules over a ring is a tilting class ...
We construct non faithful direct summands of tilting (resp. cotilting) modules large enough to inher...
The thesis compiles my contributions to the tilting theory, mainly in the set- ting of a module cate...
We describe the aboundance of selforthgonal modules big enough to satisfy all "local" properties of ...
AbstractWe study a natural generalization of *n-modules (and hence also of *-modules) by introducing...
AbstractWe provide a complete classification of all tilting modules and tilting classes over almost ...
We describe a sufficient condition which explains the aboundance of many rather small, and not neces...
We apply tilting theory to study modules of finite projective dimension. We introduce the notion of ...
Abstract. Tilting modules arose from representation theory of algebras and are known to furnish equi...
We investigate the relationship between several classes of modules generated or cogenerated in a rat...
We investigate bounded complexes T , with projective components, corresponding to partial tilting m...
We prove that every tilting module of projective dimension at most one is of finite type, namely tha...
We investigate reasonably large partial tilting or cotilting modules, obtained after the cancellatio...
We prove that any infinitely generated tilting module is of finite type, namely that its associated ...
We investigate tilting - type modules, regarded as bounded complexes of projective modules, and smal...
An important result in tilting theory states that a class of modules over a ring is a tilting class ...
We construct non faithful direct summands of tilting (resp. cotilting) modules large enough to inher...
The thesis compiles my contributions to the tilting theory, mainly in the set- ting of a module cate...
We describe the aboundance of selforthgonal modules big enough to satisfy all "local" properties of ...
AbstractWe study a natural generalization of *n-modules (and hence also of *-modules) by introducing...
AbstractWe provide a complete classification of all tilting modules and tilting classes over almost ...
We describe a sufficient condition which explains the aboundance of many rather small, and not neces...
We apply tilting theory to study modules of finite projective dimension. We introduce the notion of ...
Abstract. Tilting modules arose from representation theory of algebras and are known to furnish equi...