Complete Minimal Surfaces in R4 with Three Embedded Planar Ends

Abstract

In this paper, we study complete minimal surfaces in R4 with three embedded planar ends parallel to those of the union of the Lagrangian catenoid and the plane passing through its waist circle. We show that any complete, oriented, immersed minimal surface in R4 of finite total curvature with genus 1 and three such ends must be J-holomorphic for some almost complex structure J. Under the additional assumptions of embeddedness and at least 8 symmetries, we prove that the number of symmetries must be either 8 or 12, and in each case, the surface is uniquely determined up to rigid motions and scalings. Furthermore, we establish a nonexistence result for genus g≥2 when the surface is embedded and has at least 4(g+1) symmetries. Our approach is based on a modification of the method of Costa and Hoffman-Meeks in the setting of R4, utilizing the generalized Weierstrass representation.

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