Eisele, F. ORCID: 0000000182672094, Janssens, G. and Raedschelders, T. (2018). A reduction theorem for tau rigid modules. Mathematische Zeitschrift, 290(34), pp. 13771413. doi: 10.1007/s0020901820674
Abstract
We prove a theorem which gives a bijection between the support τ tilting modules over a given finitedimensional algebra A and the support τ tilting modules over A / I, where I is the ideal generated by the intersection of the center of A and the radical of A. This bijection is both explicit and wellbehaved. We give various corollaries of this, with a particular focus on blocks of group rings of finite groups. In particular we show that there are τ tiltingfinite wild blocks with more than one simple module. We then go on to classify all support τ tilting modules for all algebras of dihedral, semidihedral and quaternion type, as defined by Erdmann, which include all tame blocks of group rings. Note that since these algebras are symmetric, this is the same as classifying all basic twoterm tilting complexes, and it turns out that a tame block has at most 32 different basic twoterm tilting complexes. We do this by using the aforementioned reduction theorem, which reduces the problem to ten different algebras only depending on the ground field k, all of which happen to be string algebras. To deal with these ten algebras we give a combinatorial classification of all τ rigid modules over (not necessarily symmetric) string algebras.
Publication Type:  Article 

Publisher Keywords:  Representation theory of Artin algebras, τ rigid modules, String algebras, Blocks of group algebras 
Subjects:  Q Science > QA Mathematics 
Departments:  School of Mathematics, Computer Science & Engineering > Mathematics 
URI:  https://openaccess.city.ac.uk/id/eprint/23438 

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