Rank functions on rooted tree quivers
Abstract
The free abelian group R(Q) on the set of indecomposable representations of a quiver Q, over a field K, has a ring structure where the multiplication is given by the tensor product. We show that if Q is a rooted tree (an oriented tree with a unique sink), then the ring is a finitely generated -module (here is the ring R(Q) modulo the ideal of all nilpotent elements). We will describe the ring explicitly, by studying functors from the category Rep(Q) of representations of Q over K to the category of finite dimensional K-vector spaces. We also present an open problem for future direction.
Cite
@article{arxiv.0807.4496,
title = {Rank functions on rooted tree quivers},
author = {Ryan Kinser},
journal= {arXiv preprint arXiv:0807.4496},
year = {2019}
}
Comments
42 pages, hyperlinked. Incorporates suggestions from an anonymous referee, notably a proof of Prop. 2 using sheaves, correction of a minor error in Prop. 32, and elimination of the assumption "K infinite" in several parts of the conclusion