Determining unit distance graphs with coordinates in Z2 is NP-complete
Abstract
The problem of determining whether a graph G can be realized as a unit-distance graph in Z2 is NP-complete. As far as we can tell, a proof of this result has never been written up. We prove NP-completeness of this problem by implementing Eades and Whitesides' logic engine in this setting, and construct a graph that is realizable if and only if an arbitrary NA3SAT formula is satisfiable.
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