QUIZ 6 – Report (Navier-Stokes equations in Cartesian coordinates)

Let us recall some known results on the asymptotic expansions and the normal form of the regular solutions to the Navier–Stokes equations (see [5–7,10] for more details)...

There also exists a nonlinear generalized form of the Navier’s conditions.. Fujita has studied the Stokes model with those nonlinear boundary conditions, a well-posed problem leading

— We proved in Section 2 of [7] a local existence and uniqueness theorem (Theorem 2.2) for solutions of the Navier- Stokes equations with initial data in a space 7-^1 ^2,<5s ^

a thin layer near the solid wall where the liquid density is non-uniform and a central core where the liquid density is uniform. In the dynamic case a closed form analytic

The main idea is to find a correct definition of the Stokes operator in a suitable Hilbert space of divergence-free vectors and apply the Fujita-Kato method, a fixed point procedure,

Ziane, Navier Stokes equations in three dimensional thin domains with various boundary conditions, Advances in Differential Equations, 1 (1996), 499–546.

Takada, Global well-posedness and ill-posedness for the Navier-Stokes equations with the Coriolis force in function spaces of Besov type. Takada, Dispersive effects of the

Under reasonable assumptions on the growth of the nonhomogeneous term, we obtain the asymptotic behavior of the solutions.. as t --~