A new method for model validation with multivariate output

Abstract Traditional methods for model validation assessment mainly focus on validating a single response. However, for many applications joint predictions of the multiple responses are needed. It is thereby not sufficient to validate the individual responses separately, which ignores correlation among multiple responses. Validation assessment for multiple responses involves comparison with multiple experimental measurements, which makes it much more complicated than that for single response. With considering both the uncertainty and correlation of multiple responses, this paper presents a new method for validation assessment of models with multivariate output. The new method is based on principal component analysis and the concept of area metric . The method is innovative in that it can eliminate the redundant part of multiple responses while reserving their main variability information in the assessment process. This avoids directly comparing the joint distributions of computational and experimental responses. It not only can be used for validating multiple responses at a single validation site, but also is capable of dealing with the case where observations of multiple responses are collected at multiple validation sites. The new method is examined and compared with the existing u-pooling and t - pooling methods through numerical and engineering examples to illustrate its validity and potential benefits.

[1]  T. Palmer Predicting uncertainty in forecasts of weather and climate , 2000 .

[2]  M. Stephens EDF Statistics for Goodness of Fit and Some Comparisons , 1974 .

[3]  W. Briggs Statistical Methods in the Atmospheric Sciences , 2007 .

[4]  John E. Angus,et al.  The Probability Integral Transform and Related Results , 1994, SIAM Rev..

[5]  Matieyendou Lamboni,et al.  Sensitivity Analysis for Critical Control Points Determination and Uncertainty Analysis to Link FSO and Process Criteria: Application to Listeria monocytogenes in Soft Cheese Made from Pasteurized Milk , 2014, Risk analysis : an official publication of the Society for Risk Analysis.

[6]  Philippe C. Besse PCA stability and choice of dimensionality , 1992 .

[7]  Sankaran Mahadevan,et al.  Bayesian validation assessment of multivariate computational models , 2008 .

[8]  L. Guillier,et al.  Growth rate and growth probability of Listeria monocytogenes in dairy, meat and seafood products in suboptimal conditions , 2005, Journal of applied microbiology.

[9]  Christopher J. Roy,et al.  Verification and Validation in Scientific Computing , 2010 .

[10]  T. Trucano,et al.  Verification, Validation, and Predictive Capability in Computational Engineering and Physics , 2004 .

[11]  Leonard E. Schwer,et al.  An overview of the PTC 60/V&V 10: guide for verification and validation in computational solid mechanics , 2007, Engineering with Computers.

[12]  Ronald L. Iman,et al.  A Matrix-Based Approach to Uncertainty and Sensitivity Analysis for Fault Trees1 , 1987 .

[13]  Matthew F. Barone,et al.  Measures of agreement between computation and experiment: Validation metrics , 2004, J. Comput. Phys..

[14]  Wei Li,et al.  New validation metrics for models with multiple correlated responses , 2014, Reliab. Eng. Syst. Saf..

[15]  John C. W. Rayner,et al.  Power of the Neyman smooth tests for the uniform distribution , 2001, Adv. Decis. Sci..

[16]  W. Oberkampf,et al.  Model validation and predictive capability for the thermal challenge problem , 2008 .

[17]  Patrick J. Roache,et al.  Verification and Validation in Computational Science and Engineering , 1998 .

[18]  Wei Chen,et al.  Toward a Better Understanding of Model Validation Metrics , 2011 .

[19]  Andrea Saltelli,et al.  Sensitivity Analysis for Importance Assessment , 2002, Risk analysis : an official publication of the Society for Risk Analysis.

[20]  E. Borgonovo Measuring Uncertainty Importance: Investigation and Comparison of Alternative Approaches , 2006, Risk analysis : an official publication of the Society for Risk Analysis.

[21]  A. O'Hagan,et al.  Bayesian calibration of computer models , 2001 .

[22]  T. W. Anderson An Introduction to Multivariate Statistical Analysis , 1959 .

[23]  A. H. Murphy,et al.  A General Framework for Forecast Verification , 1987 .

[24]  Sankaran Mahadevan,et al.  Validation of reliability computational models using Bayes networks , 2005, Reliab. Eng. Syst. Saf..

[25]  Sankaran Mahadevan,et al.  Model Predictive Capability Assessment Under Uncertainty , 2005 .

[26]  Wei Chen,et al.  Approaches for Model Validation: Methodology and Illustration on a Sheet Metal Flanging Process , 2006 .

[27]  Sankaran Mahadevan,et al.  Validation of models with multivariate output , 2006, Reliab. Eng. Syst. Saf..

[28]  J. Augustin,et al.  Modelling the growth rate of Listeria monocytogenes with a multiplicative type model including interactions between environmental factors. , 2000, International journal of food microbiology.

[29]  I. Jolliffe Principal Component Analysis , 2002 .

[30]  Timothy G. Trucano,et al.  Verification and Validation in Computational Fluid Dynamics , 2002 .

[31]  I. Jolliffe,et al.  Forecast verification : a practitioner's guide in atmospheric science , 2011 .