Extension of Krust theorem and deformations of minimal surfaces

Abstract

In the minimal surface theory, the Krust theorem asserts that if a minimal surface in the Euclidean 3-space E3 is the graph of a function over a convex domain, then each surface of its associated family is also a graph. The same is true for maximal surfaces in the Minkowski 3-space L3. In this article, we introduce a new deformation family that continuously connects minimal surfaces in E3 and maximal surfaces in L3, and prove a Krust-type theorem for this deformation family. This result induces Krust-type theorems for various important deformation families containing the associated family and the L\'opez-Ros deformation. Furthermore, minimal surfaces in the isotropic 3-space I3 appear in the middle of the above deformation family. We also prove another type of Krust's theorem for this family, which implies that the graphness of such minimal surfaces in I3 strongly affects the graphness of deformed surfaces. The results are proved based on the recent progress of planar harmonic mapping theory.

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