The wave equation as limit of hyperbolic equations of higher order

## Abstract We study the initial‐boundary value problem for ∂~__t__~^2^__u__(__t__,__x__)+__A__(__t__)__u__(__t__,__x__)+__B__(__t__)∂~__t__~__u__(__t__,__x__)=__f__(__t__,__x__) on [0,__T__]×Ω(Ω⊂ℝ^__n__^) with a homogeneous Dirichlet boundary condition; here __A__(__t__) denotes a family of unifor

## Abstract We study the wellposedness in the Gevrey classes __G__^__s__^ and in __C__^∞^ of the Cauchy problem for weakly hyperbolic equations of higher order. In this paper we shall give a new approach to the case that the characteristic roots oscillate rapidly and vanish at an infinite number of

Assuming the smoothness and a generalized Lipschitz condition we establish the existence and uniqueness of the periodic solutions of higher order nonlinear hyperbolic partial differential equations. 1994 Acedemic Press, Inc.