Hyperbolic systems with multiple characteristics

## 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

We study symmetrization of hyperbolic first order systems. To be precise, generalizing non-degenerate double characteristics, we define non degenerate characteristics of any order. Then, assuming that the reference characteristic is non degenerate, we prove that the system is smoothly symmetrizable

An interesting phenomenon can be observed when the state-space dynamic substructural method is applied to the eigenproblem of bladed disk±shaft systems: whether or not the shaft is ¯exible, each frequency of the single root-®xed blade appears as a frequency of the whole structure with a multiplicity

We consider the initial-boundary value problem for quasi-linear symmetric hyperbolic systems with dissipation and characteristic boundary of constant multiplicity. We investigate the global existence and decay property of small regular solutions in suitable functions spaces which take into account t

## Communicated by W. To¨rnig We consider characteristic Galerkin methods for the solution of hyperbolic systems of partial differential equations of first order. A new recipe for the construction of approximate evolution operators is given in order to derive consistent methods. With the help of s