Numerical solution of differential equations by radial basis function neural networks

In this paper we present a method for solving linear ordinary differential equations (ODEs) based on multiquadric (MQ) radial basis function networks (RBFNs). According to the thought of approximation of function and/or its derivatives by using radial basis function networks [1]-[3], another new RBFN approximation procedures different from [1] are developed in this paper for solving ODES. This technique can determine all the parameters at the same time without a learning process. The advantage of this technique is that it doesn't need sufficient data, just relies on the domain and the boundary. Our results are more accurate.