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Technometrics Volume 60, 2018 - Issue 4
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Articles

Nonparametric Modeling and Prognosis of Condition Monitoring Signals Using Multivariate Gaussian Convolution Processes

Raed KontarDepartment of Industrial and Systems Engineering, University of Wisconsin-Madison, Madison, WI
,
Shiyu ZhouDepartment of Industrial and Systems Engineering, University of Wisconsin-Madison, Madison, WICorrespondence[email protected]
,
Chaitanya SankavaramGeneral Motors Research & Development, Warren, MI
,
Xinyu DuGeneral Motors Research & Development, Warren, MI
&
Yilu ZhangGeneral Motors Research & Development, Warren, MI
Pages 484-496 | Received 01 Jun 2016, Published online: 05 Jun 2018

References

  • Alvarez, M., and Lawrence, N. D. (2009), “Sparse Convolved Gaussian Processes for Multi-Output Regression,” in Advances in Neural Information Processing Systems, eds. D. Koller, D. Schuurmans, Y. Bengio, and L. Bottou, Cambridge, MA: MIT Press, pp. 57–64.
  • Argyriou, A., Evgeniou, T., and Pontil, M. (2008), “Convex Multi-Task Feature Learning,” Machine Learning, 73, 243–272.
  • Barker, C., and Newby, M. (2009), “Optimal Non-Periodic Inspection for Multivariate Degradation Model,” Reliability Engineering and System Safety, 94, 33–43.
  • Blight, B. J. N., and Ott, L. (1975), “A Bayesian Approach to Model Inadequacy for Polynomial Regression,” Biometrika, 62, 79–88.
  • Boulanger, M., and Escobar, L. A. (1994), “Experimental Design for a Class of Accelerated Degradation Tests,” Technometrics, 36, 260–272.
  • Boyle, P., and Frean, M. (2004), “Dependent Gaussian Processes,” in Advances in Neural Information Processing Systems, eds. L. Saul, Y. Weiss, and L. Bouttou, pp. 217–224.
  • Calder, C. A., and Cressie, N. (2007), “Some Topics in Convolution-Based Spatial Modeling,” in Proceedings of the 56th Session of the International Statistics Institute, pp. 22–29.
  • Caruana, R. (1997), ‘‘Multitask Learning,’’ Ph.D. dissertation, Carnegie Mellon University, Pittsburgh, PA.
  • Chakraborty, S., Gebraeel, N., Lawley, M., and Wan, H. (2009), “Residual-Life Estimation for Components with Non-Symmetric Priors,” IISE Transactions, 41, 372–387.
  • Chen, N., Ye, Z., Xiang, Y., and Zhang, L. (2015), “Condition-Based Maintenance Using the Inverse Gaussian Degradation Model,” European Journal of Operational Research, 243, 190–199.
  • Conti, S., Gosling, J. P., Oakley, J. E., and O'Hagan, A. (2009), “Gaussian Process Emulation of Dynamic Computer Codes,” Biometrika, 96, 663–676.
  • Conti, S., and O'Hagan, A. (2010), “Bayesian Emulation of Complex Multi-Output and Dynamic Computer Models,” Journal of Statistical Planning and Inference, 140, 640–651.
  • Crowder, M., and Lawless, J. (2007), “On a Scheme for Predictive Maintenance,” European Journal of Operational Research, 176, 1713–1722.
  • Ebrahimi, N. (2008),” The Mean Function of a Repairable System that is Subjected to an Imperfect Repair Policy,” IISE Transactions, 41, 57–64.
  • Elwany, A., and Gebraeel, N. (2009), “Real-Time Estimation of Mean Remaining Life Using Sensor-Based Degradation Models,” Journal of Manufacturing Science and Engineering, 131, 1–9.
  • Elwany, A. H., Gebraeel, N. Z., and Maillart, L. M. (2011), “Structured Replacement Policies for Components with Complex Degradation Processes and Dedicated Sensors,” Operations Research, 59, 684–695.
  • Gebraeel, N. Z., Lawley, M. A., Li, R., and Ryan, J. K. (2005), “Residual-Life Distributions from Component Degradation Signals: A Bayesian Approach,” IISE Transactions, 37, 543–557.
  • Guerra, R., and Goldstein, D. (2009), Meta-Analysis and Combining Information in Genetics and Genomics, Boca Raton, FL: CRC Press: Chapman & Hall.
  • Han, G., Santner, T. J., Notz, W. I., and Bartel, D. L. (2009), “Prediction for Computer Experiments having Quantitative and Qualitative Input Variables,” Technometrics, 51, 278–288.
  • Higdon, D. (2002), “Space and Space-Time Modeling Using Process Convolutions,” in Quantitative Methods for Current Environmental Issues, eds. C. W. Anderson, V. Barnett, P. C. Chatwin, and A. H. El-Shaarawi, London, UK: Springer-Verlag, pp. 37–56.
  • Huang, Y., Zhang, Q., Zhang, S., Huang, J., and Ma, S. (2017), “Promoting Similarity of Sparsity Structures in Integrative Analysis with Penalization,” Journal of the American Statistical Association, 112, 342–350.
  • Kontar, R., Son, J., Zhou, S., Sankavaram, C., Zhang, Y., and Du, X., (2017), “Remaining Useful Life Prediction based on the Mixed Effects Model with Mixture Prior Distribution,” IISE Transactions, 49, 682–697.
  • Kumar, A., and Daume III, H. (2012), “Learning Task Grouping and Overlap in Multitask Learning,” in Proceedings of the 29th International Conference on Machine Learning (ICML), Omnipress, pp. 1383–1390.
  • Li, Y., and Zhou, Q. (2016), “Pairwise Meta-Modeling of Multivariate Output Computer Models Using Nonseparable Covariance Function,” Technometrics, 58, 483–494.
  • Liu, J., Huang, J., and Ma, S. (2014), “Integrative Analysis of Cancer Diagnosis Studies with Composite Penalization,” Scandinavian Journal of Statistics, 41, 87–103.
  • Lu, C. J., and Meeker, W. O. (1993), “Using Degradation Measures to Estimate a Time-to-Failure Distribution,” Technometrics, 35, 161–174.
  • Majumdar, A., and Gelfand, A. E. (2007), “Multivariate Spatial Modeling for Geostatistical Data Using Convolved Covariance Functions,” Mathematical Geology, 39, 225–245.
  • Mardia, K. V., and Marshall, R. J. (1984), “Maximum Likelihood Estimation of Models for Residual Covariance in Spatial Regression,” Biometrika, 71, 135–146.
  • Matern, B. (1986), Spatial Variation (2nd ed.), New York: Springer-Verlag.
  • Nelson, W. B. (1990), Accelerated Testing: Statistical Models, Test Plans, and Data Analysis, New York: Wiley.
  • Paciorek, C., and Schervish, M. (2004), “Nonstationary Covariance Functions for Gaussian Process Regression,” in Advances in Neural Information Processing Systems (Vol. 16), pp. 273–280.
  • Pettit, L. I., and Young, K. D. S. (1999), “Bayesian Analysis for Inverse Gaussian Lifetime Data with Measures of Degradation,” Journal of Statistical Computation and Simulation, 63, 217–234.
  • Qian, P. Z., Wu, H., and Wu, C. J. (2008), “Gaussian Process Models for Computer Experiments with Qualitative and Quantitative Factors,” Technometrics, 50, 383–396.
  • Quinonero-Candela, J., and Rasmussen, C. E. (2005), “A Unifying View of Sparse Approximate Gaussian Process Regression,” The Journal of Machine Learning Research, 6, 1939–1959.
  • Rasmussen, C. E. (2006), Gaussian Processes for Machine Learning, Cambridge, MA: MIT Press.
  • Rizopoulos, D. (2011), “Dynamic Predictions and Prospective Accuracy in Joint Models for Longitudinal and Time-to-Event Data,” Biometrics, 67, 819–829.
  • Rizopoulos, D., Hatfield, L. A., Carlin, B. P., and Takkenberg, J. J. (2014), “Combining Dynamic Predictions from Joint Models for Longitudinal and Time-to-Event Data using Bayesian Model Averaging,” Journal of the American Statistical Association, 109, 1385–1397.
  • Rosasco, L., Alvarez, M. A., and Lawrence, N. D. (2011), “Kernels for vector-valued functions: A review,” Foundations and Trends in Machine Learning, 4, 195–266.
  • Santner, T. J., Williams, B. J., and Notz, W. I. (2003), The Design and Analysis of Computer Experiments, New York: Springer-Verlag.
  • Şentürk, D., Dalrymple, L. S., Mohammed, S. M., Kaysen, G. A., and Nguyen, D. V. (2013), “Modeling Time‐Varying Effects with Generalized and Unsynchronized Longitudinal Data,” Statistics in Medicine, 32, 2971–2987.
  • Şentürk, D., and Nguyen, D. V. (2011), “Varying Coefficient Models for Sparse Noise-Contaminated Longitudinal Data,” Statistica Sinica, 21, 1831–1856.
  • Si, X. S., Wang, W., Hu, C. H., and Zhou, D. H. (2011), “Remaining Useful Life Estimation–A Review on the Statistical Data Driven Approaches,” European Journal of Operational Research, 213, 1–14.
  • Silverman, B. W. (1996), “Smoothed Functional Principal Components Analysis by Choice of Norm,” The Annals of Statistics, 24, 1–24.
  • Snelson, E., and Ghahramani, Z. (2006), “Sparse Gaussian Processes using Pseudo-Inputs,” in Advances in Neural Information Processing Systems, eds. Y. Weiss, B. Scholkopf, B, and J. Platt, Cambridge, MA: MIT Press, (Vol. 18), pp. 1257–1264.
  • Son, J., Zhou, Q., Zhou, S., Mao, X., and Salman, M. (2013), “Evaluation and Comparison of Mixed Effects Model Based Prognosis for Hard Failure,” IEEE Transactions on Reliability, 62, 379–394.
  • Stein, A. and Corsten, I. C. A. (1991), “Universal kriging and cokriging as a regression procedure,” Biometrics, 47, 575–587.
  • Thiébaux, H. J., and Pedder, M. A. (1987), Spatial Objective Analysis: With Applications in Atmospheric Science, London: Academic Press.
  • Tseng, G., Ghosh, D., and Zhou, J. (2015), Integrating Omics Data, Cambridge: Cambridge University Press.
  • Tsui, K. L., Chen, N., Zhou, Q., Hai, Y., and Wang, W., (2015), “Prognostics and Health Management: A Review on Data Driven Approaches,” Mathematical Problems in Engineering.
  • Van Noortwijk, J. M. (2009), “A Survey of the Application of Gamma Processes in Maintenance,” Reliability Engineering & System Safety, 94, 2–21.
  • Ver Hoef, J. M., and Barry, R. P. (1998), “Constructing and Fitting Models for Cokriging and Multivariable Spatial Prediction,” Journal of Statistical Planning and Inference, 69, 275–294.
  • Yao, F., Müller, H. G., and Wang, J. L. (2005), “Functional Data Analysis for Sparse Longitudinal Data,” Journal of the American Statistical Association, 100, 577–590.
  • Yuan, X. T., Liu, X., and Yan, S. (2012), “Visual Classification with Multitask Joint Sparse Representation,” IEEE Transactions on Image Processing, 21, 4349–4360.
  • Zhang, N., and Apley, D. W. (2016), “Brownian Integrated Covariance Functions for Gaussian Process Modeling: Sigmoidal Versus Localized Basis Functions,” Journal of the American Statistical Association, 111, 1182–1195.
  • Zhang, Z., Si, X., Hu, C., and Kong, X. (2015), “Degradation Modeling–Based Remaining useful Life Estimation: A Review on Approaches for Systems with Heterogeneity,” Proceedings of the Institution of Mechanical Engineers, Part O: Journal of Risk and Reliability, 229, 343–355.
  • Zhou, Q., Son, J., Zhou, S., Mao, X., and Salman, M. (2014), “Remaining Useful Life Prediction of Individual Units Subject to Hard Failure,” IISE Transactions, 46, 1017–1030.
  • Zhou, R., Gebraeel, N., and Serban, N. (2012), “Degradation Modeling and Monitoring of Truncated Degradation Signals,” IISE Transactions, 44, 793–803.
  • Zhou, R. R., Serban, N., and Gebraeel, N. (2011), “Degradation Modeling Applied to Residual Lifetime Prediction using Functional Data Analysis,” The Annals of Applied Statistics, 5, 1586–1610.

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