Abstract
AbstractIn this work we consider solutions to stochastic partial differential equations with transport noise, which are known to converge, in a suitable scaling limit, to solution of the corresponding deterministic PDE with an additional viscosity term. Large deviations and Gaussian fluctuations underlying such scaling limit are investigated in two cases of interest: stochastic linear transport equations in dimension$$D\ge 2$$D≥2and 2D Euler equations in vorticity form. In both cases, a central limit theorem with strong convergence and explicit rate is established. The proofs rely on nontrivial tools, like the solvability of transport equations with supercritical coefficients and$$\Gamma $$Γ-convergence arguments.
Funder
Germany’s Excellence Strategy - GZ 2047/1
National Key R &D Program of China
National Natural Science Foundation of China
Youth Innovation Promotion Association, CAS
SNSF Grant
Swiss State Secretariat for Education, Research and Innovation
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Modeling and Simulation,Statistics and Probability
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