Rank of divisors on hyperelliptic curves and graphs under specialization

Abstract

Let (G, ω) be a hyperelliptic vertex-weighted graph of genus g ≥ 2. We give a characterization of (G, ω) for which there exists a smooth projective curve X of genus g over a complete discrete valuation field with reduction graph (G, ω) such that the ranks of any divisors are preserved under specialization. We explain, for a given vertex-weighted graph (G, ω) in general, how the existence of such X relates the Riemann--Roch formulae for X and (G, ω), and also how the existence of such X is related to a conjecture of Caporaso.