On non-stationary flows of incompressible asymmetric fluids

## Communicated by A. Piskorek We consider a boundary-value problem describing the motion of viscous, incompressible and heatconducting fluids in a bounded domain in R3. We admit non-homogeneous boundary conditions, the appearance of exterior forces and heat sources. Our aim is to prove the exist

## Communicated by A. Piskorek Existence, uniqueness and regularity of solutions of equations describing stationary flows of viscous incompressible isotropic fluids with an asymmetric stress tensor have been considered recently.' In this paper we extend the results of Reference 5 to include heat c

## Abstract We prove existence and uniqueness theorems for weak solutions of equations describing stationary isothermic motion of a mixture of two viscous incompressible fluids with asymmetric stress tensor, in a bounded subset of ℝ^3^. The model of the flow we consider here assumes that some of co

The paper deals with theoretical analysis of non-stationary incompressible flow through a cascade of profiles. The initial-boundary value problem for the Navier-Stokes system is formulated in a domain representing the exterior to an infinite row of profiles, periodically spaced in one direction. The