Add to ORKGWe investigate tilting - type modules, regarded as bounded complexes of projective modules, and small "deformations" of these complexes
We study a generalization of tilting modules to modules of possibly infinite projective dimension, i...
AbstractWe generalize basic results about classical tilting modules and partial tilting modules to t...
We discuss the existence of tilting modules which are direct limits of finitely generated tilting mo...
We investigate reasonably large modules with a tilting type behaviour, regarede as bounded complexes...
We investigate bounded complexes T , with projective components, corresponding to partial tilting m...
We describe the aboundance of selforthgonal modules big enough to satisfy all "local" properties of ...
AbstractA Dedekind domain R is called small if card(R)⩽2ω and card(Spec(R))⩽ω. Assuming Gödel's Axio...
We construct rather short partial tilting complexes T such that quite different indecomposable rig...
The first part of my talk will deal with "non-classical" partial tilting modules, that is partial ti...
Wev describe some resuilts of combinatorial type on Tilting Theory, concerning both "discrete" objec...
Some \u201cproper\u201d non classical partial tilting modules T have the following property: even ...
The theory for tilting and cotilting modules has its roots in the representation theory of nite dime...
We prove that every tilting module of projective dimension at most one is of finite type, namely tha...
summary:We use modules of finite length to compare various generalizations of the classical tilting ...
Let Λ be a finite dimensional, connected, associative algebra with unit over a field k. Let n be the...
We study a generalization of tilting modules to modules of possibly infinite projective dimension, i...
AbstractWe generalize basic results about classical tilting modules and partial tilting modules to t...
We discuss the existence of tilting modules which are direct limits of finitely generated tilting mo...
We investigate reasonably large modules with a tilting type behaviour, regarede as bounded complexes...
We investigate bounded complexes T , with projective components, corresponding to partial tilting m...
We describe the aboundance of selforthgonal modules big enough to satisfy all "local" properties of ...
AbstractA Dedekind domain R is called small if card(R)⩽2ω and card(Spec(R))⩽ω. Assuming Gödel's Axio...
We construct rather short partial tilting complexes T such that quite different indecomposable rig...
The first part of my talk will deal with "non-classical" partial tilting modules, that is partial ti...
Wev describe some resuilts of combinatorial type on Tilting Theory, concerning both "discrete" objec...
Some \u201cproper\u201d non classical partial tilting modules T have the following property: even ...
The theory for tilting and cotilting modules has its roots in the representation theory of nite dime...
We prove that every tilting module of projective dimension at most one is of finite type, namely tha...
summary:We use modules of finite length to compare various generalizations of the classical tilting ...
Let Λ be a finite dimensional, connected, associative algebra with unit over a field k. Let n be the...
We study a generalization of tilting modules to modules of possibly infinite projective dimension, i...
AbstractWe generalize basic results about classical tilting modules and partial tilting modules to t...
We discuss the existence of tilting modules which are direct limits of finitely generated tilting mo...