Refined Brill-Noether Theory for Complete Graphs
Abstract
The divisor theory of the complete graph Kn is in many ways similar to that of a plane curve of degree n. We compute the splitting types of all divisors on the complete graph Kn. We see that the possible splitting types of divisors on Kn exactly match the possible splitting types of line bundles on a smooth plane curve of degree n. This generalizes the earlier result of Cori and Le Borgne computing the ranks of all divisors on Kn, and the earlier work of Cools and Panizzut analyzing the possible ranks of divisors of fixed degree on Kn.
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