The Moduli Space of Harnack Curves in Toric Surfaces

Abstract

In 2006, Kenyon and Okounkov computed the moduli space of Harnack curves of degree d in CP2. We generalize to any projective toric surface some of the techniques used there. More precisely, we show that the moduli space H of Harnack curves with Newton polygon is diffeomorphic to Rm-3×R≥0n+g-m where has m edges, g interior lattice points and n boundary lattice points, solving a conjecture of Cr\'etois and Lang. Additionally, we use abstract tropical curves to construct a compactification of this moduli space by adding points that correspond to collections of curves that can be patchworked together to produce a curve in H. This compactification comes with a natural stratification with the same poset as the secondary polytope of .