Solutions to the Navier-Stokes Equations with Mixed Boundary Conditions in Two-Dimensional Bounded Domains

Abstract

In this paper we consider the system of the non-steady Navier-Stokes equations with mixed boundary conditions. We study the existence and uniqueness of a solution of this system. We define Banach spaces X and Y, respectively, to be the space of "possible" solutions of this problem and the space of its data. We define the operator N:X→ Y and formulate our problem in terms of operator equations. Let u∈ X and G Pu: X→ Y be the Frechet derivative of N at u. We prove that G Pu is one-to-one and onto Y. Consequently, suppose that the system is solvable with some given data (the initial velocity and the right hand side). Then there exists a unique solution of this system for data which are small perturbations of the previous ones. Next result proved in the Appendix of this paper is W2,2- regularity of solutions of steady Stokes system with mixed boundary condition for sufficiently smooth data.