Complex affine spheres and a Bers theorem for SL(3,C)

Abstract

For S a closed surface of genus at least 2, let Hit3(S) be the Hitchin component of representations to SL(3,R), equipped with the Labourie-Loftin complex structure. We construct a mapping class group equivariant holomorphic map from a large open subset of Hit3(S)× Hit3(S) to the SL(3,C)-character variety that restricts to the identity on the diagonal and to Bers' simultaneous uniformization on T(S)× T(S). The open subset contains Hit3(S)× T(S) and T(S)× Hit3(S), and the image includes the holonomies of SL(3,C)-opers. The map is realized by associating pairs of Hitchin representations to immersions into C3 that we call complex affine spheres, which are equivalent to certain conformal harmonic maps into SL(3,C)/SO(3,C) and to new objects called bi-Higgs bundles. Complex affine spheres are obtained by solving a second-order complex elliptic PDE that resembles both the Beltrami and Tzitz\'eica equations. To study this equation we establish analytic results that should be of independent interest.