Title :
Towards the Optimal Design of Numerical Experiments
Author :
Gazut, Stéphane ; Martinez, Jean-Marc ; Dreyfus, Gérard ; Oussar, Yacine
Author_Institution :
Centre d´´Etudes de Saclay, Gif-sur-Yvette
fDate :
5/1/2008 12:00:00 AM
Abstract :
This paper addresses the problem of the optimal design of numerical experiments for the construction of nonlinear surrogate models. We describe a new method, called learner disagreement from experiment resampling (LDR), which borrows ideas from active learning and from resampling methods: the analysis of the divergence of the predictions provided by a population of models, constructed by resampling, allows an iterative determination of the point of input space, where a numerical experiment should be performed in order to improve the accuracy of the predictor. The LDR method is illustrated on neural network models with bootstrap resampling, and on orthogonal polynomials with leave-one-out resampling. Other methods of experimental design such as random selection and D-optimal selection are investigated on the same benchmark problems.
Keywords :
design of experiments; iterative methods; learning (artificial intelligence); mathematics computing; planning (artificial intelligence); sampling methods; active learning planning method; iterative determination; learner disagreement; nonlinear surrogate model; numerical experiment design; resampling method; $D$-optimality; Active learning; bagging; bootstrap; neural networks; Algorithms; Artificial Intelligence; Models, Statistical; Monte Carlo Method; Neural Networks (Computer); Nonlinear Dynamics; X-Rays;
Journal_Title :
Neural Networks, IEEE Transactions on
DOI :
10.1109/TNN.2007.915111
