Abstract: In this paper, we consider the interactions between a rigid body of general form and the incompressible perfect fluid surrounding it. Local well-posedness in the space is obtained for the fluid-rigid body system. [Copyright &y& Elsevier]
Abstract: This paper is concerned with the initial–boundary value problem of the generalized Benjamin–Bona–Mahony–Burgers equation in the half-space Here is an unknown function of and , are two given constant states and the nonlinear function is assumed to be a strictly convex function of u. We first show that the corresponding boundary layer solution of the above initial–boundary value problem is global nonlinear stable and then, by employing the space–time weighted energy method which was initiated by Kawashima and Matsumura [S. Kawashima, A. Matsumura, Asymptotic stability of travelling wave solutions of systems for one-dimensional gas motion, Comm. Math. Phys. 101 (1985) 97–127], the convergence rates (both algebraic and exponential) of the global solution to the above initial–boundary value problem toward the boundary layer solution are also obtained for both the non-degenerate case and the degenerate case . [Copyright &y& Elsevier]
Abstract: In this paper, we study the vanishing viscosity limit of initial boundary value problems for one-dimensional mixed hyperbolic–parabolic systems when the boundary is characteristic for both the viscous and the inviscid systems: in particular, we assume that an eigenvalue of the inviscid system vanishes uniformly. We prove the stability of boundary layers expansions in small time (i.e before shocks for the inviscid system) as long as the amplitude of the boundary layers remains sufficiently small. In particular, by using Lagrangian coordinates, we apply our result to physical systems like gasdynamics and magnetohydrodynamics with homogeneous Dirichlet condition for the velocity at the boundary. [Copyright &y& Elsevier]