Minimal Lagrangian surfaces in CP2 via the loop group method Part II: The general case
Abstract
We extend the techniques introduced in DoMaB1 for contractible Riemann surfaces to construct minimal Lagrangian immersions from arbitrary Riemann surfaces into CP2 via the loop group method. Based on the potentials of translationally equivariant minimal Lagrangian surfaces, we introduce perturbed equivariant minimal Lagrangian surfaces in CP2 and construct a class of minimal Lagrangian cylinders. Furthermore, we show that these minimal Lagrangian cylinders approximate Delaunay cylinders with respect to some weighted Wiener norm of the twisted loop group SU(3)σ.
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