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Quantitative convergence rates for scaling limit of SPDEs with transport noise

Franco Flandoli, Lucio Galeati, Dejun Luo

2024Journal of Differential Equations21 citationsDOIOpen Access PDF

Abstract

We consider on the torus the scaling limit of stochastic 2D (inviscid) fluid dynamics equations with transport noise to deterministic viscous equations. Quantitative estimates on the convergence rates are provided by combining analytic and probabilistic arguments, especially heat kernel properties and maximal estimates for stochastic convolutions. Similar ideas are applied to the stochastic 2D Keller-Segel model, yielding explicit choice of noise to ensure that the blow-up probability is less than any given threshold. Our approach also gives rise to some mixing property for stochastic linear transport equations and dissipation enhancement in the viscous case.

Topics & Concepts

MathematicsInviscid flowScalingNoise (video)Limit (mathematics)Stochastic differential equationConvergence (economics)Applied mathematicsTorusStochastic partial differential equationKernel (algebra)Mathematical analysisRate of convergenceProbabilistic logicStatistical physicsPartial differential equationClassical mechanicsPhysicsGeometryStatisticsElectrical engineeringEconomic growthComputer scienceChannel (broadcasting)EngineeringArtificial intelligenceEconomicsCombinatoricsImage (mathematics)Mathematical Biology Tumor GrowthStochastic processes and financial applicationsMarkov Chains and Monte Carlo Methods