A local characterization for constant curvature metrics in 2-dimensional Lorentz manifolds

Published 24 May 2016 in math.DG | (1605.07573v1)

Abstract: In this paper we define Fermi-type coordinates in a 2-dimensional Lorentz manifold, and use this coordinate system to provide a local characterization of constant Gaussian curvature metrics for such manifolds, following a classical result from Riemann. We then exhibit particular isometric immersions of such metrics in the pseudo-Riemannian ambients L³ (i.e., usual Lorentz-Minkowski space) and R^3_2 (i.e., R³ endowed with an index 2 flat metric).

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A local characterization for constant curvature metrics in 2-dimensional Lorentz manifolds

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A local characterization for constant curvature metrics in 2-dimensional Lorentz manifolds

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