Representations of regular trees and invariants of AR-components for generalized Kronecker quivers

Abstract

We investigate the generalized Kronecker algebra Kr = kr with r ≥ 3 arrows. Given a regular component C of the Auslander-Reiten quiver of Kr, we show that the quasi-rank rk(C) ∈ Z≤ 1 can be described almost exactly as the distance W(C) ∈ N0 between two non-intersecting cones in C, given by modules with the equal images and the equal kernels property; more precisley, we show that the two numbers are linked by the inequality \[ -W(C) ≤ rk(C) ≤ - W(C) + 3.\] Utilizing covering theory, we construct for each n ∈ N0 a bijection n between the field k and \ C C \ regular component, \ W(C) = n \. As a consequence, we get new results about the number of regular components of a fixed quasi-rank.