Franco Flandoli, Lucio Galeati, Dejun Luo
Published 2020-09-28Version 1
For some deterministic nonlinear PDEs on the torus whose solutions may blow up in finite time, we show that, under suitable conditions on the nonlinear term, the blow-up is delayed by multiplicative noise of transport type in a certain scaling limit. The main result is applied to the 3D Keller-Segel, 3D Fisher-KPP and 2D Kuramoto-Sivashinsky equations, yielding long-time existence for large initial data with high probability.
Regularization by transport noise for 3D MHD equations
Weak well-posedness by transport noise for a class of 2D fluid dynamical equations
Stabilization by transport noise and enhanced dissipation in the Kraichnan model
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