Asymptotic Properties of Solutions to the Equations of Incompressible Fluid Mechanics

Equations are derived to describe the far-field laminar wake behind a body in incompressible fluid flow with an arbitrary distribution of the free-stream (unperturbed flow) velocity. For certain classes of free-stream flows, analysis of these equations enables various processes in narrow wakes or je

AbstractwWe construct two finite-difference models for the Coulomb differential equation which arises in the quantum mechanics analysis of the scattering of two charged point particles. These difference equations correspond to the standard and Mickens-Ramadhani schemes for the Coulomb equation. Our

We study the global existence of solutions of a family of equations related to some physical phenomena in dimension 3, including the usual incompressible Navier-Stokes equations with an external force. In the latter case of blow-up at T max an estimate of this time.