Moments of the 2D SHE at criticality
Yu Gu, Jeremy Quastel, Li-Cheng Tsai
Abstract
We study the stochastic heat equation in two spatial dimensions with a multiplicative white noise, as the limit of the equation driven by a noise that is mollified in space and white in time. As the mollification radius $ \varepsilon\to 0 $, we tune the coupling constant near the critical point, and show that the single time correlation functions converge to a limit written in terms of an explicit non-trivial semigroup. Our approach consists of two steps. First we show the convergence of the resolvent of the (tuned) two-dimensional delta Bose gas, by adapting the framework of Dimock and Rajeev (2004) to our setup of spatial mollification. Then we match this to the Laplace transform of our semigroup.
Topics & Concepts
ResolventWhite noiseLimit (mathematics)Convergence (economics)CriticalityMathematical analysisMathematicsLaplace transformConstant (computer programming)Multiplicative noiseNoise (video)RADIUSMultiplicative functionStatistical physicsCoupling (piping)PhysicsApplied mathematicsSpace (punctuation)Correlation function (quantum field theory)Function (biology)Stochastic processWeak convergenceCoupling constantSpace timeParameter spaceSelf-organized criticalityRadius of convergenceHeat equationStochastic processes and statistical mechanicsRandom Matrices and ApplicationsStochastic processes and financial applications