Formal Killing fields for minimal Lagrangian surfaces in complex space forms
Differential Geometry
2014-09-05 v4
Abstract
The differential system for minimal Lagrangian surfaces in a -dimensional, non-flat, complex space form is an elliptic system defined on the bundle of oriented Lagrangian planes. This is a 6-symmetric space associated with the Lie group SL(3,), and the minimal Lagrangian surfaces arise as the primitive maps. Utilizing this property, we derive the differential algebraic inductive formulas for a pair of loop algebra -valued canonical formal Killing fields. As a result, we give a complete classification of the (infinite sequence of) Jacobi fields for the minimal Lagrangian system. We also obtain an infinite sequence of higher-order conservation laws from the components of the formal Killing fields.
Cite
@article{arxiv.1311.2464,
title = {Formal Killing fields for minimal Lagrangian surfaces in complex space forms},
author = {Joe S. Wang},
journal= {arXiv preprint arXiv:1311.2464},
year = {2014}
}
Comments
57 pages. v4. misprints are corrected