Haas' theorem revisited

Abstract

Haas' theorem describes all partchworkings of a given non-singular plane tropical curve C giving rise to a maximal real algebraic curve. The space of such patchworkings is naturally a linear subspace WC of the Z/2Z-vector space C generated by the bounded edges of C, and whose origin is the Harnack patchworking. The aim of this note is to provide an interpretation of affine subspaces of C parallel to WC. To this purpose, we work in the setting of abstract graphs rather than plane tropical curves. We introduce a topological surface S above a trivalent graph , and consider a suitable affine space of real structures on S compatible with . We characterise W as the vector subspace of whose associated involutions induce the same action on H1(S,Z/2Z). We then deduce from this statement another proof of Haas' original result.