On the clique number of noisy random geometric graphs
Abstract
Let Gn be a random geometric graph, and then for q,p ∈ [0,1) we construct a "(q,p)-perturbed noisy random geometric graph" Gnq,p where each existing edge in Gn is removed with probability q, while and each non-existent edge in Gn is inserted with probability p. We give asymptotically tight bounds on the clique number ω(Gnq,p) for several regimes of parameter.
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