English

Minimal surfaces and alternating multiple zetas

Differential Geometry 2024-08-26 v2 Number Theory

Abstract

In this paper we show for every sufficiently large integer gg the existence of a complete family of closed and embedded constant mean curvature (CMC) surfaces deforming the Lawson surfaces ξ1,g\xi_{1,g} parametrized by their conformal type. When specializing to the minimal case, we discover a pattern resulting in the coefficients of the involved expansions being alternating multiple zeta values (MZVs), which generalizes the notion of Riemann's zeta values to multiple integer variables. This allows us to extend a new existence proof of the Lawson surfaces ξ1,g\xi_{1,g} to all g3g\geq 3 using complex analytic methods and to give closed form expressions of their area expansion up to order 77. For example, the third order coefficient is 94ζ(3)\tfrac{9}{4}\zeta(3) (the first and second order term were shown to be log(2)\log(2) and 00 respectively in \cite{HHT}). As a corollary, we obtain that the area of ξ1,g\xi_{1,g} is monotonically increasing in their genus gg for all g0.g\geq 0.

Keywords

Cite

@article{arxiv.2407.07130,
  title  = {Minimal surfaces and alternating multiple zetas},
  author = {Steven Charlton and Lynn Heller and Sebastian Heller and Martin Traizet},
  journal= {arXiv preprint arXiv:2407.07130},
  year   = {2024}
}

Comments

85 pages, 13 figures, 4 appendices. Includes ancillary Mathematica files verifying calculations. This paper supersedes arXiv:2108.10214

R2 v1 2026-06-28T17:34:48.431Z