Weak-strong uniqueness and vanishing viscosity for incompressible Euler equations in exponential spaces
Abstract
In the class of admissible weak solutions, we prove a weak-strong uniqueness result for the incompressible Euler equations assuming that the symmetric part of the gradient belongs to L1 loc([0,+∞);L exp(Rd;Rd× d)), where L exp denotes the Orlicz space of exponentially integrable functions. Moreover, under the same assumptions on the limit solution to the Euler system, we obtain the convergence of vanishing-viscosity Leray--Hopf weak solutions of the Navier--Stokes equations.
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