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Finiteness of Totally Magnetic Hypersurfaces
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🧮 math.DG
math.DS
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magneticclosedformhypersurfacesreal-analytictotallycurveddynamical
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By introducing a dynamical version of the second fundamental form, we generalize a recent result of Filip-Fisher-Lowe to the setting of magnetic systems. Namely, we show that a real-analytic negatively $s$-curved magnetic system on a closed real-analytic manifold has only finitely many closed totally $s$-magnetic hypersurfaces, unless the magnetic 2-form is trivial and the underlying metric is hyperbolic.
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Topics in Magnetic Geometry: Interpolation, Intersections and Integrability
Magnetic geodesic flows interpolate between sub-Riemannian and magnetic vector field flows, magnetomorphism actions produce Poisson-commuting integrals, and totally magnetic submanifolds are closed under fixed points ...
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