The gonality of circulant graphs (2508.05761v1)

Abstract: The gonality of a graph measures how difficult it is to move chips around the entirety of a graph according to certain chip-firing rules without introducing debt. In this paper we study the gonality of circulant graphs, a class of vertex-transitive graphs that can be specified by their number of vertices together with a list of cyclic adjacency relations satisfied by all vertices. We provide a universal upper bound on the gonality of all circulant graphs with a fixed adjacency list, which holds irrespective of the number of vertices. We use this upper bound together with computational methods to determine that the gonality of the (4)-regular Harary graph on (n) vertices is (10) for (n\geq 16). As a special case, this gives the gonality of sufficiently large antiprism graphs to be (10).