Tuesday, May 3, 14:00, 7.527
René Marczinzik, On homological dimensions of Nakayama and related
We report on bounds of the dominant dimension of Nakayama and related algebras.
This corrects and proves a conjecture of Abrar.
We report on work in progress about dominant and Gorenstein dimensions of
Morita-Nakayama algebras. This has relations to combinatorics and number theory.
Part 3: We propose a plan to give a classification of gendo-symmetric
representation-finite algebras up to almost \nu-stable derived equivalence. We
also report on a qpa-programm to test finite representation type.
We present some
Part 3 is joint work with Bernhard Böhmler and people are invited
to participate in a classification.