On modules with trivial self-extensions

A conjecture of Tachikawa states that every finitely generated non-projective module \(M\) over a self-injective artinian ring \(R\) has a self-extension, i.e., \(\operatorname{Ext}_{R}^{i}(M, M)\) \(\neq 0\) for some \(i \geqslant 1\). We show that Tachikawa's conjecture holds for a class of radica

For a given entwining structure A, C involving an algebra A, a coalgebra C, C Ž . Ž . and an entwining map : C m A ª A m C, a category M of right A, C -A modules is defined and its structure analysed. In particular, the notion of a ˜Ž . Ž . measuring of A, C to A, C is introduced, and certain functo

We derive a cancellation theorem for degenerations of modules that says in particular, that projective or injective common direct summands can always be neglected. Combining the cancellation result with the existence of almost split sequences we characterize the orbit closure of a module living on p