Linear Systems on Edge-Weighted Graphs
arXiv:1105.0227 · doi:10.1216/RMJ-2016-46-5-1559
Abstract
Let R be any subring of the reals. We present a generalization of linear systems on graphs where divisors are R-valued functions on the set of vertices and graph edges are permitted to have nonegative weights in R. Using this generalization, we provide an independent proof of a Riemann-Roch formula, which implies the Riemann-Roch formula of Baker and Norine.
11 pages