Refined uniqueness results for 2D Euler and gSQG with rough Kraichnan noise

Abstract

We prove strong well-posedness results for the stochastic 2D Euler equations in vorticity form and generalized SQG equations, with Lp initial data and driven by a spatially rough, incompressible transport noise of Kraichnan type. Previous works addressed this problem with noise of spatial regularity α∈ (0,1/2), in a setting where a rougher noise yields a stronger regularization. We remove this limitation by allowing any α ∈ (0,1), covering the same range of parameters for which anomalous regularization effects are known to occur in passive scalars. In particular, this covers the physically relevant case α=2/3, associated with the Richardson-Kolmogorov scaling of energy cascade.