Some results on evolutoids of convex curves in 2-dimensional space forms

Abstract

Let Mc be a 2-dimensional space form of constant curvature c=-1,0,1 and γ a smooth, closed, convex curve in Mc. We explicitly parametrize the α-evolutoid of γ, i.e.\ the closed curve γα describing the envelope of all geodesics σs=σs(t) such that σs(0)=γ(s) and (σs'(0),γ'(s))=α, with α∈[0,π/2] fixed and determine its lenght. Also, we deduce that for each s the points γ(s),γα(s),γπ/2(s) belong to a distinct geodesic circle. A constraint for the smoothness of γα is calculated and, using tools from singularity theory, we prove that its singularities present cuspidal features, which mimics the classical evolute (α=π/2) in the plane case. Also, we define the α-involutoids of a given curve η in Mc to be any curve γ in Mc such that γα=η and study some of its properties. In particular, we prove that any convex, closed curve in M-1,0 has associated to itself exactly one closed α-involutoid. Finally, we show that the evolutoids can be seen as singular sets of wavefronts.

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