Global well-posedness and small time asymptotics of stochastic Ladyzhenskaya-Smagorinsky equations with damping on unbounded domains

Abstract

The Ladyzhenskaya-Smagorinsky equations model turbulence phenomena, and are given by ∂ u∂ t-μ div((1+|∇u|2)p-22∇u)+(u·∇)u+∇ p=f, \ ∇·u=0, for p≥ 2. In this work, we consider the stochastic Ladyzhenskaya-Smagorinsky equations with the damping αu+β|u|r-2u, for r≥ 2 (α,β≥ 0), subjected to multiplicative Gaussian noise in a Poincar\'e domain (which may be bounded or unbounded) O⊂Rd (2≤ d≤ 4). We show the local monotonicity (p≥ d2+1,\ r≥ 2) as well as global monotonicity (p≥ 2,\ r≥ 4) properties of the linear and nonlinear operators, which along with an application of a stochastic version of the Minty-Browder technique imply the existence of a unique pathwise strong solution satisfying the energy equality (It\o formula), which is proved with the help of the methodology developed in [Krylov, Probab. Theory Related Fields, 147 (2010), 583--605.] Then, we discuss the small time asymptotics by studying the effect of small, highly nonlinear, unbounded drifts (small time large deviation principle) for the stochastic Ladyzhenskaya-Smagorinsky equations with damping.

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