Perturbed cone theorems for proper harmonic maps
Abstract
Inspired by the halfspace theorem for minimal surfaces in R3 of Hoffman-Meeks, the halfspace theorem of Rodriguez-Rosenberg, and the cone theorem of Omori, we derive new non-existence results for proper harmonic maps into perturbed cones in Rn, horospheres in Hn and also into perturbed Riemannian cones. The technical tool in use is an extension of the foliated maximum principle appearing in Assimos-Jost to the non-compact setting.
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