Speciality:
01.02.05 (Mechanics of fluids, gases and plasmas)
Birth date:
10.09.1927
E-mail: Keywords: differential equations; equations of mathematical physics; theoretic hydrodynamics.
Subject:
The reflection of the spherical shock wave from the plane wall was investigated. The approximate solution of this problem in the neighbourhood of the reflection point was obtained in the form of the truncated series. The asymptotics at infinity of the viscous fluid 3D steady flow around a smooth body was investigated in the two articles. The first of these was written in collaboration with K. I. Babenko. In the second article some restrictions to body shape were taken off and the theorem about the force acting on an arbitrary smooth body was proved. This theorem for the tranverse force component is an analog of the known Joukowsky lift theorem for the case of 3D viscous flow around a body. With the use of hydrodynamic potentials a number of problems related to the viscous incompressible fluid flow was considered. The solution asymptotics of some boundary-value problems in the cases of systems of the equations for the plane and axially symmetric viscous, heat conducting gas flows were determined.
Main publications:
Bruno A. D., Vasiliev M. M. Asymptotic analysis of the viscous fluid flow around a flat plate by Newton polyhedron // Nonlinear Analysis, Theory, Methods and Applications. 1997, 30(8), 4765–4770 (Proc. 2nd World Congress of Nonlinear Analysis).