Representations of Quivers over F1

Abstract

We define and study the category of representations of a quiver in - the category of vector spaces "over ". is an -linear category possessing kernels, co-kernels, and direct sums. Moreover, satisfies analogues of the Jordan-H\"older and Krull-Schmidt theorems. We are thus able to define the Hall algebra of , which behaves in some ways like the specialization at q=1 of the Hall algebra of Rep(, Fq). We prove the existence of a Hopf algebra homomorphism of ': (+) → , from the enveloping algebra of the nilpotent part + of the Kac-Moody algebra with Dynkin diagram - the underlying unoriented graph of . We study ' when is the Jordan quiver, a quiver of type A, the cyclic quiver, and a tree respectively.