Hopf actions of some quantum groups on path algebras

TL;DR

This paper classifies actions of quantum groups on path algebras of quivers, providing conditions for these actions to factor through finite-dimensional quotients and describing related bimodule categories.

Contribution

It introduces a parametrization of quantum group actions on quiver path algebras and characterizes bimodule categories via quivers with relations.

Findings

Actions of quantum Borel subalgebras are parametrized on path algebras.

Necessary and sufficient conditions for actions to factor through finite-dimensional quotients.

Bimodule categories are equivalent to categories of representations of specific quivers.

Abstract

Our first collection of results parametrize (filtered) actions of a quantum Borel $U_q(\mathfrak{b}) \subset U_q(\mathfrak{sl}_2)$ on the path algebra of an arbitrary (finite) quiver. When $q$ is a root of unity, we give necessary and sufficient conditions for these actions to factor through corresponding finite-dimensional quotients, generalized Taft algebras $T(r,n)$ and small quantum groups $U_q(\mathfrak{sl}_2)$. In the second part of the paper, we shift to the language of tensor categories. Here we consider a quiver path algebra equipped with an action of a Hopf algebra $H$ to be a tensor algebra in the tensor category of representations $H$. Such a tensor algebra is generated by an algebra and bimodule in this tensor category. Our second collection of results describe the corresponding bimodule categories via an equivalence with categories of representations of certain explicitly described quivers with relations.