English

Abstract

The paper deals with the Stokes problem, associated with a flow of a viscous incompressible fluid through a spatially periodic profile cascade. We use results from [32] (the maximum regularity property in the $L^2$-framework) and [33] (the weak solvability in $W^{1,r}$), and extend the findings on the maximum regularity property to the general $L^r$-framework (for $1<r<\infty$). Using the reduction to one spatial period $\Omega$, the problem is formulated by means of boundary conditions of three types: the conditions of periodicity on curves $\Gamma_0$ and $\Gamma_1$, the Dirichlet boundary conditions on $\Gamma_{\rm in}$ and $\Gamma_P$ and an artificial do nothing-type boundary condition on $\Gamma_{\rm out}$ (see Fig. 1). We show that, although domain $\Omega$ is not and different types of boundary conditions meet in the vertices of $\partial\Omega$, the considered problem has a strong solution with the maximum regularity property for smooth data. We explain the sense in which the do nothing boundary condition is satisfied for both weak and strong solutions.