On the pathwise uniqueness of stochastic 2D Euler equations with Kraichnan noise and Lp-data
Abstract
In the recent work [arXiv:2308.03216], Coghi and Maurelli proved pathwise uniqueness of solutions to the vorticity form of stochastic 2D Euler equation, with Kraichnan transport noise and initial data in L1 Lp for p>3/2. The aim of this note is to remove the constraint on p, showing that pathwise uniqueness holds for all L1 Lp initial data with arbitrary p>1.
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