A Note on Helicoidal Singular Minimal Surfaces
Abstract
Let α∈ and let v∈3 be a unit vector. A singular minimal surface in Euclidean space is a surface whose mean curvature H satisfies H=α N,v p,v, where N is the unit normal vector of . In this short note we study singular minimal surfaces which are invariant by a one-parameter group of helicoidal motions. We prove that if is a helicoidal singular minimal surface, then the axis of the helicoidal motion is orthogonal to v, α=-1 and is a circular right cylinder.
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