On the Combinatorics of $\mathbb{F}_1$-Representations of Pseudotree Quivers (2301.07221v1)

Abstract: We investigate quiver representations over $\mathbb{F}1$. Coefficient quivers are combinatorial gadgets equivalent to $\mathbb{F}_1$-representations of quivers. We focus on the case when the quiver $Q$ is a pseudotree. For such quivers, we first use the notion of coefficient quivers to provide a complete classification of asymptotic behaviors of indecomposable representations over $\mathbb{F}_1$. Then, we prove some fundamental structural results about the Lie algebras associated to pseudotrees. Finally, we construct examples of $\mathbb{F}_1$-representations $M$ of a quiver $Q$ by using coverings, under which the Euler characteristics of the quiver Grassmannians $\textrm{Gr}^Q{\underline{d}}(M)$ can be computed in a purely combinatorial way.