Evolution of locally dependent random graphs
Abstract
In this paper we study d-dependent random graphs -- introduced by Brody and Sanchez -- which are the family of random graph distributions where each edge is present with probability p, and each edge is independent of all but at most d other edges. For this random graph model, we analyze degree sequences, jumbledness, connectivity, and subgraph containment. Our results mirror those of the classical Erdos--R\'enyi random graph, which are recovered by specializing our problem to d=0, although we show that in many regards our setting is appreciably more nuanced. We survey what is known for this model and conclude with a variety of open questions.
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