Domains without parabolic minimal submanifolds and weakly hyperbolic domains

Abstract

We show that if is an m-convex domain in Rn for some 2 m<n whose boundary b has a tubular neighbourhood of positive radius and is not m-flat near infinity, then does not contain any immersed parabolic minimal submanifold of dimension m. In particular, if M is a properly embedded nonflat minimal hypersurface in Rn with a tubular neighbourhood of positive radius then every immersed parabolic hypersurface in Rn intersects M. In dimension n=3 this holds if M has bounded Gaussian curvature. We also introduce the class of weakly hyperbolic domains in Rn characterised by the property that every conformal harmonic map C is constant, and we elucidate their relationship with hyperbolic domains and domains without parabolic minimal surfaces.

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