English

Surfaces isotropes de $\mathbb{O}$ et syst\`{e}mes int\'{e}grables

Differential Geometry 2007-05-23 v3

Abstract

We define a notion of isotropic surfaces in O\mathbb{O}, i.e. on which some canonical symplectic forms vanish. Using the cross-product in O\mathbb{O} we define a map ρ ⁣:Gr_2(O)S6\rho\colon Gr\_2(\mathbb{O})\to S^6 from the Grassmannian of O\mathbb{O} to S6S^6. This allows us to associate to each surface Σ\Sigma of O\mathbb{O} a function ρ_Σ ⁣:ΣS6\rho\_{\Sigma}\colon \Sigma\to S^6. Then we show that the isotropic surfaces in O\mathbb{O} such that ρ_Σ\rho\_{\Sigma} is harmonic are solutions of a completely integrable system. Using loop groups we construct a Weierstrass type representation of these surfaces. By restriction to HO \mathbb{H}\subset\mathbb{O} we obtain as a particular case the Hamiltonian Stationary Lagrangian surfaces of R4\mathbb{R}^4, and by restriction to Im(H)\text{Im}(\mathbb{H}) we obtain the CMC surfaces of R3\mathbb{R}^3.

Keywords

Cite

@article{arxiv.math/0511258,
  title  = {Surfaces isotropes de $\mathbb{O}$ et syst\`{e}mes int\'{e}grables},
  author = {Idrisse Khemar},
  journal= {arXiv preprint arXiv:math/0511258},
  year   = {2007}
}