OBTAINING THE SELF-SIMILAR ASYMPTOTICS OF SOLUTIONS TO THE NAVIER-STOKES EQUATIONS BY POWER GEOMETRY

The Power Geometry is applied to the boundary problems for the planar and axially-symmetric steady flows of the viscous heat conducting gas. The well-known problem of the boundary layer on the semi-infinite flat plate is considered as example. The asymptotics of the flow at infinity in the conical diffuser is considered here for the first time.