Title :
Convergence of Kohonen´s learning vector quantization
Author :
Baras, John S. ; LaVigna, Anthony
Abstract :
It is shown that the learning vector quantization (LVQ) algorithm (T. Kohonen, 1986), converges to locally asymptotic stable equilibria of an ordinary differential equation. It is shown that the learning algorithm performs stochastic approximation. Convergence of the vectors is guaranteed under the appropriate conditions on the underlying statistics of the classification problem. Also presented is a modification to the learning algorithm which results in more robust convergence. With this modification, it is possible to show that as the appropriate parameters go to infinity, the decision regions associated with the modified LVQ algorithm approach the Bayesian optimal
Keywords :
convergence; learning systems; parallel algorithms; stochastic processes; Bayesian optimal; classification problem; learning algorithm; learning vector quantization; locally asymptotic stable equilibria; modified LVQ algorithm; ordinary differential equation; robust convergence; stochastic approximation; underlying statistics;
Conference_Titel :
Neural Networks, 1990., 1990 IJCNN International Joint Conference on
Conference_Location :
San Diego, CA, USA
DOI :
10.1109/IJCNN.1990.137818
