Harmonic spinors on axisymmetric 3-manifolds with Melvin ends
classification
🧮 math-ph
math.DGmath.MP
keywords
axisymmetricharmonicmanifoldsmelvinspinorasymptoticconstantcurvature
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We prove the existence of harmonic spinor fields in axisymmetric Riemannian 3-manifolds having nonnegative scalar curvature and asymptotic to the usual constant time hypersurface of Melvin's magnetic universe. Such a spinor can be used in the proof of the uniqueness of the magnetized Schwarzschild solution.
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