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First order complexity of finite random structures

Published 4 Feb 2024 in cs.LO, cs.DM, math.CO, math.LO, and math.PR | (2402.02567v2)

Abstract: For a sequence of random structures with $n$-element domains over a relational signature, we define its first order (FO) complexity as a certain subset in the Banach space $\ell{\infty}/c_0$. The well-known FO zero-one law and FO convergence law correspond to FO complexities equal to ${0,1}$ and a subset of $\mathbb{R}$, respectively. We present a hierarchy of FO complexity classes, introduce a stochastic FO reduction that allows to transfer complexity results between different random structures, and deduce using this tool several new logical limit laws for binomial random structures. Finally, we introduce a conditional distribution on graphs, subject to a FO sentence $\varphi$, that generalises certain well-known random graph models, show instances of this distribution for every complexity class, and prove that the set of all $\varphi$ validating 0--1 law is not recursively enumerable.

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