Critical threshold for weakly interacting log-correlated focusing Gibbs measures

Abstract

We study log-correlated Gibbs measures on the d-dimensional torus with weakly interacting focusing quartic potentials whose coupling constants tend to 0 as we remove regularization. In particular, we exhibit a phase transition for this model by identifying a critical threshold, separating the weakly and strongly coupling regimes; in the weakly coupling regime, we show that the frequency-truncated measures converge to the base Gaussian measure (possibly with a renormalized L2-cutoff), whereas, in the strongly coupling regime, we prove non-convergence of the frequency-truncated measures, even up to a subsequence. Our result answers an open question posed by Brydges and Slade (1996).

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