We study the 2d directed polymer in random environment in a novel quasi-critical regime, which interpolates between the much studied subcritical and critical regimes. We prove Edwards–Wilkinson fluctuations throughout the quasi-critical regime, showing that the diffusively rescaled partition functions are asymptotically Gaussian. We deduce a corresponding result for the critical 2d Stochastic Heat Flow. A key challenge is the lack of hypercontractivity, which we overcome deriving new moment estimates.
Caravenna, F., Cottini, F., Rossi, M. (2025). Quasi-critical fluctuations for 2D directed polymers. THE ANNALS OF APPLIED PROBABILITY, 35(4), 2604-2643 [10.1214/25-AAP2182].
Quasi-critical fluctuations for 2D directed polymers
Caravenna F.
;Cottini F.;Rossi M.
2025
Abstract
We study the 2d directed polymer in random environment in a novel quasi-critical regime, which interpolates between the much studied subcritical and critical regimes. We prove Edwards–Wilkinson fluctuations throughout the quasi-critical regime, showing that the diffusively rescaled partition functions are asymptotically Gaussian. We deduce a corresponding result for the critical 2d Stochastic Heat Flow. A key challenge is the lack of hypercontractivity, which we overcome deriving new moment estimates.
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