Homology Generators and Relations for the Ordered Configuration Space of a Star Graph

Abstract

We study the ordered configuration spaces of star graphs. Inspired by the representation stability results of Church--Ellenberg--Farb for the ordered configuration space of a manifold and the edge stability results of An--Drummond-Cole--Knudsen for the unordered configuration space of a graph, we determine how the ordered configuration space of a star graph with k leaves behaves as we add particles at the leaves. We show that, as a module over the combinatorial category FIk, o, the first homology of this ordered configuration space is finitely generated by 4 particles for k=3, by 3 particles for k=4, and by 2 particles for k 5. Additionally, we prove that every relation among homology classes can be described by relations on at most 6 particles for k=4, at most 5 particles when k=5, at most 4 particles when k=6, and at most 3 particles for k 7, while proving that adding particles always introduces new relations when k=3. This proves that there is no finite universal presentation for the homology of ordered configuration spaces of graphs.