Surfaces in a strict Walker 3-manifold that contain non-null curves with zero torsion
Abstract
Given a non-null curve γ in a strict Walker 3-manifold, first we show that (locally) γ lies in a flat cylinder with a null axis. Secondly, we construct an example of such a curve γ and such a cylinder S that contains γ . In particular, the hypothesis that S is totally geodesic has some consequence on the geometry of the ambient Walker 3-manifold.
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