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Quasipotential and exit time for 2D Stochastic Navier-Stokes equations driven by space time white noise

We are dealing with the Navier-Stokes equation in a bounded regular domain $D$ of $\mathbb{R}^2$, perturbed by an additive Gaussian noise $\partial w^{Q_δ}/\partial t$, which is white in time and colored in space. We assume that the correlation radius of the noise gets smaller and smaller as $δ\searrow 0$, so that the noise converges to the white noise in space and time. For every $δ>0$ we introduce the large deviation action functional $S^δ_{0,T}$ and the corresponding quasi-potential $U_δ$ and, by using arguments from relaxation and $Γ$-convergence we show that $U_δ$ converges to $U=U_0$, in spite of the fact that the Navier-Stokes equation has no meaning in the space of square integrable functions, when perturbed by space-time white noise. Moreover, in the case of periodic boundary conditions the limiting functional $U$ is explicitly computed. Finally, we apply these results to estimate of the asymptotics of the expected exit time of the solution of the stochastic Navier-Stokes equation from a basin of attraction of an asymptotically stable point for the unperturbed system.