We consider the stationary spatial axisymmetric flow of the
viscous incompressible fluid along a semi-infinite needle.
It is described by Navier-Stokes system of equations, which is reduced
to a system of two partial differential equations.
The boundary conditions are set at infinity and at the needle.
It's proved that for x → +∞ in boundary layer there is no solution
satisfying all boundary conditions.
We used results of our preprint 'Methods of a study of the boundary layer on a needle'.
Publication language:russian, pages:26
Mathematical problems and theory of numerical methods