Large deviation principles for graphon sampling
Abstract
We investigate possible large deviation principles (LDPs) for the n-vertex sampling from a given graphon with various speeds s(n) and resolve all the cases except when the speed s(n) is of order n2. For quadratic speed s=(c+o(1))n2, we establish an LDP for an arbitrary k-step graphon, which extends a result of Chatterjee and Varadhan [Europ. J. Combin., 32 (2011) 1000-1017] who did this for k=1 (that is, for the homogeneous binomial random graphs). This is done by reducing the problem to the LDP for stochastic k-block models established recently by Borgs, Chayes, Gaudio, Petti and Sen ["A large deviation principle for block models", arxiv:2007.14508, 2020]. Also, we improve some results by Borgs et al.
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