Curves in Riemannian Manifolds Making Prescribed Angles With Torse-Forming Vector Fields

Abstract

In this paper, we introduce the notion of a prescribed angle curve in a Riemannian manifold associated with a pair (V,θ), where V is a unit vector field along the curve and θ denotes the angle between V and the principal normal vector of the curve. When V is a torse-forming vector field, we establish an existence result for prescribed angle curves. In the 3-dimensional case, we determine the curvatures of these curves in terms of the prescribed angle and the potential function of V. Moreover, using this notion, we provide a new characterization of curves lying on geodesic spheres in real space forms.

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