Abstract
In this paper we prove the existence and uniqueness of strong solutions for the stochastic Navier--Stokes equation in bounded and unbounded domains. These solutions are stochastic analogs of the classical Lions--Prodi solutions to the deterministic Navier---Stokes equation. Local monotonicity of the nonlinearity is exploited to obtain the solutions in a given probability space and this significantly improves the earlier techniques for obtaining strong solutions, which depended on pathwise solutions to the Navier--Stokes martingale problem where the probability space is also obtained as a part of the solution.
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