A case study of the long-time behavior of the Gaussian local-field equation
Abstract
For any integer ≥ 2, the -local-field equation (-LFE) characterizes the limit of the neighborhood path empirical measure of interacting diffusions on -regular random graphs, as the graph size goes to infinity. It has been conjectured that the long-time behavior of the (in general non-Markovian) -LFE coincides with that of a certain more tractable Markovian analog, the Markov -local-field equation. In the present article, we prove this conjecture for the case when = 2 and the diffusions are one-dimensional with affine drifts. As a by-product of our proof, we also show that for interacting diffusions on the n-cycle (or 2-regular random graph on n vertices), the limits n → ∞ and t→ ∞ commute. Along the way, we also establish well-posedness of the Markov -local field equations with affine drifts for all ≥ 2, which may be of independent interest.
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