The space of complete embedded maximal surfaces with isolated singularities in the 3-dimensional Lorentz-Minkowski space 3

Abstract

We show that a complete embedded maximal surface in the 3-dimensional Lorentz-Minkowski space L3 with a finite number of singularities is, up to a Lorentzian isometry, an entire graph over any spacelike plane asymptotic to a vertical half catenoid or a horizontal plane and with conelike singular points. We study the space Gn of entire maximal graphs over \x3=0\ in L3 with n+1 ≥ 2 conelike singularities and vertical limit normal vector at infinity. We show that Gn is a real analytic manifold of dimension 3n+4, and the coordinates are given by the position of the singular points in R3 and the logarithmic growth at the end. We also introduce the moduli space Mn of marked graphs with n+1 singular points (a mark in a graph is an ordering of its singularities), which is a (n+1)-sheeted covering of Gn. We prove that identifying marked graphs differing by translations, rotations about a vertical axis, homotheties or symmetries about a horizontal plane, the corresponding quotient space Mn is an analytic manifold of dimension 3n-1.

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