Ekman boundary layers in rotating fluids

Existence for Euler and Prandtl equations. Construction of the Navier-Stokes solution. Swann, The convergence with vanishing viscosity of non-stationary Navier-Stokes flow to ideal

We want to improve the convergence result of [16] and show the global in time convergence of the weak solution of the system of rotating fluids towards the solution of a

Les fissures longitudinales dans les bandes de roulement sont probablement causées par la fatigue de la structure par excès de contrainte à la base de la ou des couches traitées

[39] N. Masmoudi: Ekman layers of rotating fluids: the case of general initial data. Nishida: The initial value problem for the equations of motion of viscous and

In this subsection, we state and prove a convergence result for the fully non-homogeneous case, where we are able to pass to the limit to the full system, in which the dynamics of

For general ill-prepared initial data, in the former article it was proved the convergence of the model to a 2-D quasi-geostrophic equation, by resorting to the spectral analysis of

Family caregiving in hospice: effects on psychological and health functioning among spousal caregivers of hospice patients with lung cancer or dementia. Predictors

For fluids with shear-rate dependent viscosity the base flow is no longer an exact solution of the Navier-Stokes equations, however, in the limit of large Reynolds number the