Abstract
This paper presents a novel VLSI architecture for the training of radial basis function (RBF) networks. The architecture contains the circuits for fuzzy C-means (FCM) and the recursive Least Mean Square (LMS) operations. The FCM circuit is designed for the training of centers in the hidden layer of the RBF network. The recursive LMS circuit is adopted for the training of connecting weights in the output layer. The architecture is implemented by the field programmable gate array (FPGA). It is used as a hardware accelerator in a system on programmable chip (SOPC) for real-time training and classification. Experimental results reveal that the proposed RBF architecture is an effective alternative for applications where fast and efficient RBF training is desired.
Highlights
Radial basis function (RBF) [1,2] networks have been found to be effective for many real world applications due to their ability to approximate complex nonlinear mappings with a simple topological structure
A basic RBF network consists of three layers: An input layer, a hidden layer with a nonlinear kernel, and a linear output layer
The recursive Least Mean Square (LMS) circuit is adopted for the training of connecting weights in the output layer
Summary
Radial basis function (RBF) [1,2] networks have been found to be effective for many real world applications due to their ability to approximate complex nonlinear mappings with a simple topological structure. A basic RBF network consists of three layers: An input layer, a hidden layer with a nonlinear kernel, and a linear output layer. The Gaussian function is commonly used for the nonlinear kernel. The parameter estimation of RBF networks concerns the optimization of centers of the Gaussian kernels as well as the connecting weights between neurons. The estimation of the above parameters is carried out using two-staged learning strategies. Cluster analysis is implemented to calculate the appropriate values of the centers. In the second stage, supervised optimization procedures are involved in the optimal estimation of the connecting weights
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