Title :
Nonlinear Model Selection Based on the Modulus of Continuity
Author :
Koo, Imhoi ; Kil, Rhee Man
Author_Institution :
Korea Adv. Inst. of Sci. & Technol., Daejeon
Abstract :
The prediction risk estimation in nonlinear regression models including artificial neural networks is especially important for problems with limited data since it can be used as a tool for finding the optimal model (or network architecture) minimizing the expected risk. In this paper, we suggest the prediction risk bounds of nonlinear regression models. The suggested bounds are derived from the modulus of continuity for a multivariate function. We also present the model selection criteria referred to as the modulus of continuity information criteria (MCIC) derived from the suggested prediction risk bounds. Through the simulation for function approximation, we have shown that the suggested MCIC is effective in nonlinear model selection problems with limited data.
Keywords :
estimation theory; function approximation; neural nets; prediction theory; regression analysis; risk analysis; artificial neural networks; continuity information criteria modulus; continuity modulus; expected risk minimisation; function approximation; model selection criteria; multivariate function; nonlinear model selection problems; prediction risk estimation; Artificial neural networks; Bayesian methods; Function approximation; Linear regression; Loss measurement; Performance loss; Predictive models; Size measurement; Statistical analysis; Virtual colonoscopy;
Conference_Titel :
Neural Networks, 2006. IJCNN '06. International Joint Conference on
Conference_Location :
Vancouver, BC
Print_ISBN :
0-7803-9490-9
DOI :
10.1109/IJCNN.2006.246910
