A local estimate for maximal surfaces in Lorentzian product spaces
Abstract
In this paper we introduce a local approach for the study of maximal surfaces immersed into a Lorentzian product space of the form M2× R1, where M2 is a connected Riemannian surface and M2× R1 is endowed with the product Lorentzian metric. Specifically, we establish a local integral inequality for the squared norm of the second fundamental form of the surface, which allows us to derive an alternative proof of our Calabi-Bernstein theorem given in AA.
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