Space-like maximal surfaces containing entire null lines in Lorentz-Minkowski 3-space
Abstract: Consider a surface $S$ immersed in the Lorentz-Minkowski 3-space $\boldsymbol R3_1$. A complete light-like line in $\boldsymbol R3_1$ is called an entire null line on the surface $S$ in $\boldsymbol R3_1$ if it lies on $S$ and consists of only null points with respect to the induced metric. In this paper, we show the existence of embedded space-like maximal graphs containing entire null lines. If such a graph is defined on a convex domain in $\boldsymbol R2$, then it must be a light-like plane. Our example is critical in the sense that it is defined on a certain non-convex domain.
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