Boundary control of hyperbolic systems and homogenization theory

The behavior of multi-dimensional discrete Boltzmann systems with highly oscillatory data is studied. Homogenized equations for the mean solutions are obtained. Uniform convergence of the oscillatory solutions of the discrete Boltzmann equations to the solutions of the corresponding homogenized quat

In this paper the exact boundary controllability of nodal profile, originally proposed by M. Gugat et al., is studied for general 1-D quasilinear hyperbolic systems with general nonlinear boundary conditions.

## Abstract The author studies the mixed problem for the linear symmetric hyperbolic systems with maximally non‐negative and characteristic boundary condition. Existence of a unique solution is proved inside a suitable class of functions of weighted Sobolev type which takes account of the loss of r