Fuchsian DPW potentials for Lawson surfaces

Abstract

The Lawson surfaces 1,g of genus g are constructed by rotating and reflecting the Plateau solution ft with respect to a particular geodesic 4-gon t along its boundary, where t= 12g+2 is an angle of t. In this paper we combine the existence and regularity of the Plateau solution ft in t ∈ (0, 14) with topological information about the moduli space of Fuchsian systems on the 4-puncture sphere to obtain existence of a Fuchsian DPW potential ηt for every ft with t∈(0, 14]. Moreover, the coefficients of ηt are shown to depend real analytically on t. This implies that the Taylor approximation of the DPW potential ηt and of the area obtained at t=0 found in HHT2 determines these quantities for all 1,g. In particular, this leads to an algorithm to conformally parametrize all Lawson surfaces 1,g.