论文信息 - Calculation of Cramer Rao maximum a posteriori lower bounds from training data

Calculation of Cramer Rao maximum a posteriori lower bounds from training data

A neural network approach is presented to estimate the Cramer Rao maximum a posteriori (CRM) lower bounds on estimation error variances. First, from training data an additive statistical signal model is obtained by a feedforward neural network which maps output vectors back to input vectors. The CRM lower bounds are then calculated through the signal model. In neural network applications, the CRM lower bounds can be used: 1) to help determine when to stop training the network; and 2) to determine the importance of input features according to their contributions to the bounds. The convergence of the modeling procedure is shown. Examples are given to illustrate the proposed approach.

Michael T. Manry | Cheng-Hsiung Hsieh | Ting-Cheng Chang

[1] R. Viswanathan,et al. An introduction to statistical signal processing with applications , 1979 .

[2] Paul J. Werbos,et al. Backpropagation Through Time: What It Does and How to Do It , 1990, Proc. IEEE.

[3] N. Ahmed,et al. FAST TRANSFORMS, algorithms, analysis, applications , 1983, Proceedings of the IEEE.

[4] Michael T. Manry,et al. Minimum mean square estimation and neural networks , 1996, Neurocomputing.

[5] Michael T. Manry,et al. Cramer Rao Maximum A-Posteriori Bounds on Neural Network Training Error for Non-Gaussian Signals and Parameters , 1996 .