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arxiv: 2011.12812 · v3 · pith:KA4TNESKnew · submitted 2020-11-25 · 🧮 math.PR · math-ph· math.MP

KPZ-type fluctuation exponents for interacting diffusions in equilibrium

classification 🧮 math.PR math-phmath.MP
keywords connell-yorfunctionpolymerclassdiffusionsequilibriumexpectedheight
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We consider systems of $N$ diffusions in equilibrium interacting through a potential $V$. We study a "height function" which for the special choice $V(x) = \e^{-x}$, coincides with the partition function of a stationary semidiscrete polymer, also known as the (stationary) O'Connell-Yor polymer. For a general class of smooth convex potentials (generalizing the O'Connell-Yor case), we obtain the order of fluctuations of the height function by proving matching upper and lower bounds for the variance of order $N^{2/3}$, the expected scaling for models lying in the KPZ universality class. The models we study are not expected to be integrable and our methods are analytic and non-perturbative, making no use of explicit formulas or any results for the O'Connell-Yor polymer.

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