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Kernel density estimation for undirected dyadic data
Abstract: We study nonparametric estimation of density functions for undirected dyadic random variables (i.e., random variables defined for all n def ≡ N 2 unordered pairs of agents/nodes in a weighted network of order N). These random variables satisfy a local dependence property: any random variables in the network that share one or two indices may be dependent, while those sharing no indices in common are independent. In this setting, we show that density functions may be estimated by an application of the kernel est…
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Cited by 2 publications
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