On quiver representations over F1

Abstract

We study the category Rep(Q,F1) of representations of a quiver Q over "the field with one element", denoted by F1, and the Hall algebra of Rep(Q,F1). Representations of Q over F1 often reflect combinatorics of those over Fq, but show some subtleties - for example, we prove that a connected quiver Q is of finite representation type over F1 if and only if Q is a tree. Then, to each representation V of Q over F1 we associate a coefficient quiver V possessing the same information as V. This allows us to translate representations over F1 purely in terms of combinatorics of associated coefficient quivers. We also explore the growth of indecomposable representations of Q over F1 - there are also similarities to representations over a field, but with some subtle differences. Finally, we link the Hall algebra of the category of nilpotent representations of an n-loop quiver over F1 with the Hopf algebra of skew shapes introduced by Szczesny.