Characterization of 3D Sasakian manifold from magnetic Hopf surfaces
Abstract
In a three-dimensional Riemannian manifold M that admits a unit Killing vector field , we regard as a magnetic vector field. A magnetic Hopf surface is a surface obtained by Lie dragging the magnetic curve with . Then we characterize Sasakian structure on M from magnetic Hopf surfaces. That is, we show that if an arbitrary magnetic Hopf surface is a constant mean curvature surface then M is a Sasakian manifold.
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