Coefficient Quivers, F1-Representations, and Euler Characteristics of Quiver Grassmannians
Abstract
A quiver representation assigns a vector space to each vertex, and a linear map to each arrow. When one considers the category Vect(F1) of vector spaces ``over F1'' (the field with one element), one obtains F1-representations of a quiver. In this paper, we study representations of a quiver over the field with one element in connection to coefficient quivers. To be precise, we prove that the category Rep(Q,F1) is equivalent to the (suitably defined) category of coefficient quivers over Q. This provides a conceptual way to see Euler characteristics of a class of quiver Grassmannians as the number of ``F1-rational points'' of quiver Grassmannians. We generalize techniques originally developed for string and band modules to compute the Euler characteristics of quiver Grassmannians associated to F1-representations. These techniques apply to a large class of F1-representations, which we call the F1-representations with finite nice length: we prove sufficient conditions for an F1-representation to have finite nice length, and classify such representations for certain families of quivers. Finally, we explore the Hall algebras associated to F1-representations of quivers. We answer the question of how a change in orientation affects the Hall algebra of nilpotent F1-representations of a quiver with bounded representation type. We also discuss Hall algebras associated to representations with finite nice length, and compute them for certain families of quivers.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.