论文信息 - Proof of hidden node number and experiments on RBF network for well log data inversion

Proof of hidden node number and experiments on RBF network for well log data inversion

In the multilayer perceptron (MLP), there was a theorem about the maximum number of separable regions (M) given the number of hidden nodes (H) in the input d-dimensional space. We propose a recurrence relation to prove the theorem using the expansion of recurrence relation instead of proof by induction. We use three-layer radial basis function net (RBF) on the well log data inversion to test the number of hidden nodes determined by the theorem. The three-layer RBF has more nonlinear mapping. In the experiments, we have 31 simulated well log data. 25 well log data are used for training, and 6 are for testing. The experimental results can support the number of hidden nodes determined by the theorem.

Kou-Yuan Huang | Liang-Chi Shen | Li-Sheng Weng | Jiun-Der You

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