Complete families of embedded high genus CMC surfaces in the 3-sphere (with an appendix by Steven Charlton)

Abstract

For every g 1, we show the existence of a complete and smooth family of closed constant mean curvature surfaces fg, ∈ [0, π2], in the round 3-sphere deforming the Lawson surface 1, g to a doubly covered geodesic 2-sphere with monotonically increasing Willmore energy. To construct these we use an implicit function theorem argument in the parameter t= 12(g+1). This allows us to give an iterative algorithm to compute the power series expansion of the DPW potential and area of fg at t= 0 explicitly. In particular, we obtain for large genus Lawson surfaces 1,g % due to the real analytic dependence of its area and DPW potential on t, a scheme to explicitly compute the coefficients of the power series in t in terms of multiple polylogarithms. Remarkably, the third order coefficient of the area expansion is identified with 94ζ(3), where ζ is the Riemann ζ function (while the first and second order term were shown to be (2) and 0 respectively in HHT).