posted on 2010-01-18, 13:51authored byDanilo P. Mandic, Jonathon Chambers
Conditions for global asymptotic stability (GAS) of a nonlinear relaxation equation realised by a nonlinear autoregressive moving average (NARMA) recurrent perceptron are provided. Convergence is derived through fixed point iteration (FPI) techniques, based upon a contraction mapping feature of a nonlinear activation function of a neuron. Furthermore, nesting is shown to be a spatial interpretation of an FPI, which underpins a pipelined recurrent neural network (PRNN) for nonlinear signal processing
History
School
Mechanical, Electrical and Manufacturing Engineering
Citation
MANDIC, D.P. and CHAMBERS, J., 1999. Global asymptotic convergence of nonlinear relaxation equations realised through a recurrent perceptron. IN: Proceedings of the 1999 IEEE International Conference on Acoustics, Speech and Signal Processing. ICASSP '99, Phoenix, Arizona, 15th-19th March 1999, Vol. 2, pp. 1037-1040