Abstract.
This is the second in a series of papers investigating the space of Brauer relations of a finite group, the kernel of the natural map from its Burnside ring to the rational representation ring. The first paper classified all primitive Brauer relations, that is those that do not come from proper subquotients. In the case of quasi-elementary groups the description is intricate, and it does not specify groups that have primitive relations in terms of generators and relations. In this paper we provide such a classification in terms of generators and relations for quasi-elementary groups of order paq.
Funding source: EPSRC
Funding source: Royal Commission for the Exhibition of 1851
Award Identifier / Grant number: Research Fellowship
Funding source: Royal Society University
Award Identifier / Grant number: Research Fellowship
Funding source: St Johns College in Cambridge
Funding source: Robinson College in Cambridge
Funding source: DPMMS in Cambridge
Funding source: CRM in Barcelona
Funding source: Postech University in Pohang
© 2014 by Walter de Gruyter Berlin/Boston
