Working with differential, functional and difference equations using functional networks

In this paper we first analyze the problem of equivalence of differential, functional and difference equations and give methods to move between them. We also introduce functional networks, a powerful alternative to neural net works, which allow neural functions to be different, multidimensional, mult iargument and constrained by link connections, and use them for predicting values of magnitudes satisfying differential, functional and/or difference equations, and for obtaining the difference and differential equation assoc iated with a set of data. The estimation of the differential or difference equation coefficients is done by simply solving systems of linear equations , in the cases of equally or unequally spaced or missing data points. Some examples of applications are given to illustrate the method. (C) 1999 Elsev ier Science Inc. All rights reserved.