Relative Brauer relations of abelian p-groups
Abstract
The Brauer relations of a finite group G are virtual differences of non-isomorphic G-sets X-Y which induce isomorphic permutation G-representations Q[X] Q[Y] over the rationals. These relations have been classified by Tornehave-Bouc and Bartel-Dokchitser. Motivated by stable homotopy theory, a relative version of Brauer relations for (G,Cp)-bisets which are Cp-free have been classified by Kahn in case G is an elementary Abelian p-group. In this paper we extend Kahn's classification to the case when G is a finite Abelian p-group.
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