Multivariate global sensitivity analysis for dynamic models based on energy distance

In this paper, a new kind of multivariate global sensitivity index based on energy distance is proposed. The covariance decomposition based index has been widely used for multivariate global sensitivity analysis. However, it just considers the variance of multivariate model output and ignores the correlation between different outputs. The proposed index considers the whole probability distribution of dynamic output based on characteristic function and contains more information of uncertainty than the covariance decomposition based index. The multivariate probability integral transformation based index is an extension of the popularly used moment-independent sensitivity analysis index. Although it considers the whole probability distribution of dynamic output, it is difficult to estimate the joint cumulative distribution function of dynamic output. The proposed sensitivity index can be easily estimated, especially for models with high dimensional outputs. Compared to the classic sensitivity indices, the proposed sensitivity index can be easily used for dynamic systems and obtain reasonable results. An efficient method based on the idea of the given-data method is used to estimate the proposed sensitivity index with only one set of input-output samples. The numerical and engineering examples are employed to compare the proposed index and the covariance decomposition based index. The results show that the input variables may have different effect on the whole probability distribution and variance of dynamic model output since the proposed index and the covariance decomposition based index measure the effects of input variables on the whole distribution and variance of model output separately.

[1]  Zhenzhou Lu,et al.  Variable importance analysis: A comprehensive review , 2015, Reliab. Eng. Syst. Saf..

[2]  M. Faddy,et al.  Likelihood Computations for Extended Poisson Process Models , 1999 .

[3]  Elmar Plischke,et al.  An adaptive correlation ratio method using the cumulative sum of the reordered output , 2012, Reliab. Eng. Syst. Saf..

[4]  Saltelli Andrea,et al.  Global Sensitivity Analysis: The Primer , 2008 .

[5]  Francesca Pianosi,et al.  A simple and efficient method for global sensitivity analysis based on cumulative distribution functions , 2015, Environ. Model. Softw..

[6]  Emanuele Borgonovo,et al.  Global sensitivity measures from given data , 2013, Eur. J. Oper. Res..

[7]  Zhonglai Wang,et al.  Unified uncertainty analysis by the mean value first order saddlepoint approximation , 2012 .

[8]  Emanuele Borgonovo,et al.  Sensitivity analysis: A review of recent advances , 2016, Eur. J. Oper. Res..

[9]  Emanuele Borgonovo,et al.  A new uncertainty importance measure , 2007, Reliab. Eng. Syst. Saf..

[10]  Matieyendou Lamboni,et al.  Multivariate global sensitivity analysis for dynamic crop models , 2009 .

[11]  A. Saltelli,et al.  On the Relative Importance of Input Factors in Mathematical Models , 2002 .

[12]  Zhen Hu,et al.  Global sensitivity analysis-enhanced surrogate (GSAS) modeling for reliability analysis , 2016 .

[13]  Brian J. Williams,et al.  Sensitivity analysis when model outputs are functions , 2006, Reliab. Eng. Syst. Saf..

[14]  Albert J. Valocchi,et al.  Global Sensitivity Analysis for multivariate output using Polynomial Chaos Expansion , 2014, Reliab. Eng. Syst. Saf..

[15]  Zhenzhou Lu,et al.  A new kind of sensitivity index for multivariate output , 2016, Reliab. Eng. Syst. Saf..

[16]  A. Saltelli,et al.  Sensitivity Anaysis as an Ingredient of Modeling , 2000 .

[17]  J. C. Helton,et al.  Uncertainty and sensitivity analysis in performance assessment for the Waste Isolation Pilot Plant , 1999 .

[18]  Maria L. Rizzo,et al.  Measuring and testing dependence by correlation of distances , 2007, 0803.4101.

[19]  Sankaran Mahadevan,et al.  An efficient modularized sample-based method to estimate the first-order Sobol' index , 2016, Reliab. Eng. Syst. Saf..

[20]  Toshimitsu Homma,et al.  A New Importance Measure for Sensitivity Analysis , 2010 .

[21]  Maria L. Rizzo,et al.  Energy distance , 2016 .

[22]  Zhenzhou Lu,et al.  Temporal and spatial multi-parameter dynamic reliability and global reliability sensitivity analysis based on the extreme value moments , 2017 .

[23]  David Makowski,et al.  Multivariate sensitivity analysis to measure global contribution of input factors in dynamic models , 2011, Reliab. Eng. Syst. Saf..

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

[25]  Zhenzhou Lu,et al.  A kernel estimate method for characteristic function-based uncertainty importance measure , 2017 .

[26]  Ying Xiong,et al.  A new sparse grid based method for uncertainty propagation , 2010 .

[27]  Fabrice Gamboa,et al.  Sensitivity indices for multivariate outputs , 2013, 1303.3574.

[28]  I. Sobola,et al.  Global sensitivity indices for nonlinear mathematical models and their Monte Carlo estimates , 2001 .

[29]  C. Manohar,et al.  Global response sensitivity analysis using probability distance measures and generalization of Sobol's analysis , 2015 .

[30]  Emanuele Borgonovo,et al.  A Common Rationale for Global Sensitivity Measures and Their Estimation , 2016, Risk analysis : an official publication of the Society for Risk Analysis.

[31]  Ronald L Iman,et al.  Uncertainty Analysis for Computer Model Projections of Hurricane Losses , 2005, Risk analysis : an official publication of the Society for Risk Analysis.

[32]  H Christopher Frey,et al.  Comparison of Sensitivity Analysis Methods Based on Applications to a Food Safety Risk Assessment Model , 2004, Risk analysis : an official publication of the Society for Risk Analysis.

[33]  Maria L. Rizzo,et al.  A new test for multivariate normality , 2005 .

[34]  Zhen Hu,et al.  Mixed Efficient Global Optimization for Time-Dependent Reliability Analysis , 2015 .

[35]  Max D. Morris,et al.  Factorial sampling plans for preliminary computational experiments , 1991 .

[36]  Jun Yang,et al.  Space-partition method for the variance-based sensitivity analysis: Optimal partition scheme and comparative study , 2014, Reliab. Eng. Syst. Saf..

[37]  Agus Sudjianto,et al.  Relative Entropy Based Method for Probabilistic Sensitivity Analysis in Engineering Design , 2006 .

[38]  Sankaran Mahadevan,et al.  Uncertainty quantification in reliability estimation with limit state surrogates , 2016 .

[39]  I. Sobol,et al.  Construction and Comparison of High-Dimensional Sobol' Generators , 2011 .

[40]  Zequn Wang,et al.  Piecewise point classification for uncertainty propagation with nonlinear limit states , 2017 .

[41]  I. Sobol Uniformly distributed sequences with an additional uniform property , 1976 .

[42]  Paola Annoni,et al.  Variance based sensitivity analysis of model output. Design and estimator for the total sensitivity index , 2010, Comput. Phys. Commun..

[43]  Emanuele Borgonovo,et al.  Uncertainty and global sensitivity analysis in the evaluation of investment projects , 2006 .

[44]  Qiao Liu,et al.  A new computational method of a moment-independent uncertainty importance measure , 2009, Reliab. Eng. Syst. Saf..

[45]  Maria L. Rizzo,et al.  Energy statistics: A class of statistics based on distances , 2013 .

[46]  Cui Li Importance measures of basic variable under multiple failure modes and their solutions , 2010 .

[47]  Stefano Tarantola,et al.  Sensitivity analysis of spatial models , 2009, Int. J. Geogr. Inf. Sci..

[48]  Christian Genest,et al.  On the multivariate probability integral transformation , 2001 .