Shotgun Assembly of Random Geometric Graphs
Abstract
In a recent work, Huang and Tikhomirov considered the shotgun assembly for Erd os-R\'enyi graphs G(n,pn) with pn=n-α, and showed that the graph is reconstructable if 0<α < 12 and not reconstructable if 12<α<1 from its 1-neighbourhoods. In this article, we consider random geometric graphs G(n,r), where r2=n-α and 0<α<1, on flat torus. Interestingly, unlike the results for the Erd os-R\'enyi random graphs, we show that the random geometric graph is always reconstructable from its 1-neighbourhoods.
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