Real inflection points of real hyperelliptic curves

Abstract

Given a real hyperelliptic algebraic curve X with non-empty real part and a real effective divisor D arising via pullback from P1 under the hyperelliptic structure map, we study the real inflection points of the associated complete real linear series |D| on X. To do so we use Viro's patchworking of real plane curves, recast in the context of some Berkovich spaces studied by M. Jonsson. Our method gives a simpler and more explicit alternative to limit linear series on metrized complexes of curves, as developed by O. Amini and M. Baker, for curves embedded in toric surfaces.