2D Navier-Stokes equation with cylindrical fractional Brownian noise
Abstract
We consider the Navier-Stokes equation on the 2D torus, with a stochastic forcing term which is a cylindrical fractional Wiener noise of Hurst parameter H. Following [3,8] which dealt with the case 1/2, we prove a local existence and uniqueness result when 7/16< H< 1/ 2 and a global existence and uniqueness result when 1/2<H<1.
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