Generic sampling and invariant measures on the space of k-uniform hypergraphs
Abstract
We prove a model-theoretic representation theorem for the distribution of an ergodic exchangeable k-uniform hypergraph: every such measure arises as the pushforward of the countably-iterated Morley product of a global Borel-definable Keisler measure over the countable universal homogeneous k-uniform hypergraph. We show this by starting with a Borel k-hypergraphon W and constructing a Keisler measure μW such that generic sampling with respect to μW yields the same invariant measure as does the standard hypergraphon sampling procedure with respect to W. When k = 2, our results give a new representation theorem for ergodic exchangeable graphs via Keisler measures over a monster model of the Rado graph.
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