The Critical 2d Stochastic Heat Flow and Related Models
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In these lecture notes, we review recent progress in the study of the stochastic heat equation and its discrete analogue, the directed polymer model, in spatial dimension 2. It was discovered that a phase transition emerges on an intermediate disorder scale, with Edwards-Wilkinson (Gaussian) fluctuations in the sub-critical regime. In the critical window, a unique scaling limit has been identified and named the critical 2d stochastic heat flow. This gives a meaning to the solution of the stochastic heat equation in the critical dimension 2, which lies beyond existing solution theories for singular SPDEs. We outline the proof ideas, introduce the key ingredients, and discuss related literature on disordered systems and singular SPDEs. A list of open questions is also provided.
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Cited by 2 Pith papers
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Strong Disorder for Stochastic Heat Flow and 2D Directed Polymers
Establishes sharp local extinction rates and transition scales for 2D SHF together with free-energy asymptotics for directed polymers in strong disorder.
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An upper bound of the lower tail of the mass of balls under the critical $2d$ stochastic heat flow
An upper bound on the lower tail of the mass of balls under the critical 2d stochastic heat flow is proved, implying integrability and strict positivity of the logarithm of this mass.
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