Finite GK-dimensional pre-Nichols algebras and quasi-quantum groups
Abstract
In this paper, we study the classification of finite GK-dimensional pre-Nichols algebras in the twisted Yetter-Drinfeld module category $_{\k G}^{\k G} \mathcal{YD}^\Phi$, where $G$ is a finite abelian group and $\Phi$ is a $3$-cocycle on $G$. These algebras naturally arise from quasi-quantum groups over finite abelian groups. We prove that all pre-Nichols algebras of nondiagonal type in $_{\k G}^{\k G} \mathcal{YD}^\Phi$ are infinite GK-dimensional, and every graded pre-Nichols algebra in $_{\k G}^{\k G} \mathcal{YD}^\Phi$ with finite GK-dimension is twist equivalent to a graded pre-Nichols algebra in an ordinary Yetter-Drinfeld module category $_{\k G}^{\k G} \mathcal{YD}^\Phi$, where $\mathbb{G}$ is a finite abelian group determined by $G$. In particular, we obtain a complete classification of finitely generated Nichols algebras with finite GK-dimension in $_{\k G}^{\k G} \mathcal{YD}^\Phi$. We prove that a finitely generated Nichols algebra in $_{\k G}^{\k G} \mathcal{YD}^\Phi$ is finite GK-dimensional if and only if it is of diagonal type and the corresponding root system is finite, i.e., an arithmetic root system. Via bosonization, this yields a large class of infinite quasi-quantum groups over finite abelian groups.