Title :
Cellular neural networks with nearly arbitrary nonlinear weight functions
Author :
Loncar, A. ; Tetzlaff, R.
Author_Institution :
Inst. fur Angewandte Phys., Frankfurt Univ., Germany
Abstract :
We present cellular neural networks (CNN) with a new type of nonlinear weight functions. Instead of representing a weight function by a n-th order polynom, we propose tabulated functions by using a cubic spline interpolation procedure. These CNN are considered for the problem of modelling nonlinear systems, which are characterized by partial differential equations (PDE). Therefore we propose a training algorithm to adjust the behaviour of CNN solutions to the solutions of a given nonlinear system. Results are given for the Φ4-equation and the achieved accuracy is compared to the approximation accuracy of solutions obtained by a direct spatial discretization of the Φ4 -equation
Keywords :
cellular neural nets; interpolation; learning (artificial intelligence); multilayer perceptrons; nonlinear systems; partial differential equations; splines (mathematics); Φ4-equation; approximation accuracy; cubic spline interpolation procedure; direct spatial discretization; nearly arbitrary nonlinear weight functions; nonlinear systems; tabulated functions; training algorithm; Cellular neural networks; Differential equations; Electronic mail; Interpolation; Nonlinear dynamical systems; Nonlinear equations; Nonlinear systems; Partial differential equations; Polynomials; Spline;
Conference_Titel :
Cellular Neural Networks and Their Applications, 2000. (CNNA 2000). Proceedings of the 2000 6th IEEE International Workshop on
Conference_Location :
Catania
Print_ISBN :
0-7803-6344-2
DOI :
10.1109/CNNA.2000.876840
