Asymptotic properties of general symmetric hyperbolic systems

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

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

l)revious articles on the construction of nomographs with hyperbolic coordinates have dealt only briefly with the properties of the coordinate systems, attention being devoted primarily to practical applications. Extensive application of these methods, however, requires imagination and the freedom t