论文信息 - An easily calculated bound on condition for orthogonal algorithms

An easily calculated bound on condition for orthogonal algorithms

Orthogonal search techniques are often used in training generalized single-layer networks (GSLNs) such as the radial basis function (RBF) network. Care must be taken with these techniques in order to avoid ill-conditioning of the required data matrix. The usual approach is to impose an arbitrary lower limit, say d/sub min/, on the norms of the orthogonal expansion terms, or equivalently on the diagonal values in the Cholesky decomposition matrices, which are calculated by the algorithms in question. In the paper, a bound on the condition number of the data matrix in terms of these qualities is given, and is used to derive a model-dependent guideline for d/sub min/.

Michael J. Korenberg | Katheryn Margaret Adeney | M. Korenberg | K. M. Adeney

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