Small modules with interesting rank varieties
Abstract
This paper focuses on the rank varieties for modules over a group algebra FE where E is an elementary abelian p-group and p is the characteristic of an algebraically closed field F. In the first part, we give a sufficient condition for a Green vertex of an indecomposable module containing an elementary abelian p-group E in terms of the rank variety of the module restricted to E. In the second part, given a homogeneous algebraic variety V , we explore the problem on finding a small module with rank variety V . In particular, we examine the simple module D(kp-p+1,1p-1) for the symmetric group Skp.
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