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Scaling limit of wetting models in $1+1$ dimensions pinned to a shrinking strip

We consider wetting models in $1+1$ dimensions on a shrinking strip with a general pinning function. We show that under diffusive scaling, the interface converges in law to to the reflected Brownian motion, whenever the strip size is $o(N^{-1/2})$ and the pinning function is close enough to critical value of the so-called $δ$-pinning model of Deuschel, Giacomin, and Zambotti [DGZ05]. As a corollary, the same result holds for the constant pinning strip wetting model at criticality with $o(N^{-1/2})$ strip size.

preprint2018arXivOpen access
Jean-Dominique DeuschelTal Orenshtein
math-phmath.PRmath.MP
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Jean-Dominique DeuschelTal Orenshtein

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