On difference approximations of the dissipative type for hyperbolic differential equations

Sufficient conditions are established for the oscillations of systems of hyperbolic differential equations of the form 2 d Ž . . where ⍀ is a bounded domain in R n with a piecewise smooth boundary Ѩ ⍀, and ⌬ is the Laplacian in Euclidean n-space R n .

## Abstract We consider a hyperbolic–parabolic singular perturbation problem for a quasilinear hyperbolic equation of Kirchhoff type with dissipation weak in time. The purpose of this paper is to give time‐decay convergence estimates of the difference between the solutions of the hyperbolic equatio

In this paper we show that the set of solutions of the Nicoletti or Floquet boundary value problems for hyperbolic differential equations is nonempty compact and convex. We apply the Browder᎐Godhe᎐Kirk fixed point theorem.

A computational method for the solution of dierential equations is proposed. With this method an accurate approximation is built by incremental additions of optimal local basis functions. The parallel direct search software package (PDS), that supports parallel objective function evaluations, is use