Representations of Kronecker quivers and Steiner bundles on Grassmannians

Abstract

Let k be an algebraically closed field. Connections between representations of the generalized Kronecker quivers Kr and vector bundles on Pr-1 have been known for quite some time. This article is concerned with a particular aspect of this correspondence, involving more generally Steiner bundles on Grassmannians Grd(kr) and certain full subcategories repproj(Kr,d) of relative projective Kr-representations. Building on a categorical equivalence first explicitly established by Jardim and Prata, we employ representation-theoretic techniques provided by Auslander-Reiten theory and reflection functors to organize indecomposable Steiner bundles in a manner that facilitates the study of bundles enjoying certain properties such as uniformity and homogeneity. Conversely, computational results on Steiner bundles motivate investigations in repproj(Kr,d), which elicit the conceptual sources of some recent work on the subject. From a purely representation-theoretic vantage point, our paper initiates the investigation of certain full subcategories of the, for r\!\!3, wild category of Kr-representations. These may be characterized as being right Hom-orthogonal to certain algebraic families of elementary test modules.