On the Size of Minimal Surfaces in R4

Abstract

The Gauss map g of a surface in R4 takes its values in the Grassmannian of oriented 2-planes of R4: G+(2,4). We give geometric criteria of stability for minimal surfaces in R4 in terms of g. We show in particular that if the spherical area of the Gauss map |g()| of a minimal surface is smaller than 2π then the surface is stable by deformations which fix the boundary of the surface.This answers a question of Barbosa and Do Carmo in R4.

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