The Generalized Quasilinearization Method for Partial Differential Equations of First Order

## Abstract In this paper numerical methods for solving first‐order hyperbolic partial differential equations are developed. These methods are developed by approximating the first‐order spatial derivative by third‐order finite‐difference approximations and a matrix exponential function by a third‐o

A splitting of a third-order partial differential equation into a first-order and a second-order one is proposed as the basis for a mixed finite element method to approximate its solution. A time-continuous numerical method is described and error estimates for its solution are demonstrated. Finally,

We apply the generalized quasilinearization method of V. Lakshmikantham Ž Ž . . Nonlinear Anal. 27 1996 , 223᎐227 and the extended method of R. N. Mohapa-Ž . tra, K. Vajravelu, and Y. Yin J. Optim. Theory Appl., in press to the first order Ž . X Ž . Ž . Ž . initial value problem IVP for short x t s

In the article classical solutions of initial problems for nonlinear differential equations with deviated variables are approximated by solutions of quasilinear systems of difference equations. Interpolating operators on the Haar pyramid are used. Sufficient conditions for the convergence of the met