Unitary vector fields are Fermi–Walker transported along Rytov–Legendre curves
M Crasmareanu, C Frigioiu - International Journal of Geometric …, 2015 - World Scientific
International Journal of Geometric Methods in Modern Physics, 2015•World Scientific
Fix ξ a unitary vector field on a Riemannian manifold M and γ a non-geodesic Frenet curve
on M satisfying the Rytov law of polarization optics. We prove in these conditions that γ is a
Legendre curve for ξ if and only if the γ-Fermi–Walker covariant derivative of ξ vanishes. The
cases when γ is circle or helix as well as ξ is (conformal) Killing vector filed or potential
vector field of a Ricci soliton are analyzed and an example involving a three-dimensional
warped metric is provided. We discuss also K-(para) contact, particularly (para) Sasakian …
on M satisfying the Rytov law of polarization optics. We prove in these conditions that γ is a
Legendre curve for ξ if and only if the γ-Fermi–Walker covariant derivative of ξ vanishes. The
cases when γ is circle or helix as well as ξ is (conformal) Killing vector filed or potential
vector field of a Ricci soliton are analyzed and an example involving a three-dimensional
warped metric is provided. We discuss also K-(para) contact, particularly (para) Sasakian …
Fix ξ a unitary vector field on a Riemannian manifold M and γ a non-geodesic Frenet curve on M satisfying the Rytov law of polarization optics. We prove in these conditions that γ is a Legendre curve for ξ if and only if the γ-Fermi–Walker covariant derivative of ξ vanishes. The cases when γ is circle or helix as well as ξ is (conformal) Killing vector filed or potential vector field of a Ricci soliton are analyzed and an example involving a three-dimensional warped metric is provided. We discuss also K-(para)contact, particularly (para)Sasakian, manifolds and hypersurfaces in complex space forms.
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