Computes position vector components of rectifying and osculating curves in the {T, N, T×N} frame on immersed surfaces and shows invariance under isometry iff normal curvature is invariant or position vector aligns with tangent.
and Nesovic, E., Some characterizations of null, pseudo null and partially n ull rectifying curves in Minkowski space-time , Taiwanese J
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Some characterizations of Rectifying and osculating curves on a smooth immersed surface
Computes position vector components of rectifying and osculating curves in the {T, N, T×N} frame on immersed surfaces and shows invariance under isometry iff normal curvature is invariant or position vector aligns with tangent.