Representations of constant socle rank for the Kronecker algebra

Abstract

Inspired by recent work of Carlson, Friedlander and Pevtsova concerning modules for p-elementary abelian groups Er of rank r over a field of characteristic p > 0, we introduce the notions of modules with constant d-radical rank and modules with constant d-socle rank for the generalized Kronecker algebra Kr = kr with r ≥ 2 arrows and 1 ≤ d ≤ r-1. We study subcategories given by modules with the equal d-radical property and the equal d-socle property. Utilizing the Simplification method due to Ringel, we prove that these subcategories in mod \ Kr are of wild type. Then we use a natural functor F mod \ Kr mod \ kEr to transfer our results to mod \ kEr.