Practical Reliability and Uncertainty Quantification in Complex Systems: Final Report

The purpose of this project was to investigate the use of Bayesian methods for the estimation of the reliability of complex systems. The goals were to find methods for dealing with continuous data, rather than simple pass/fail data; to avoid assumptions of specific probability distributions, especially Gaussian, or normal, distributions; to compute not only an estimate of the reliability of the system, but also a measure of the confidence in that estimate; to develop procedures to address time-dependent or aging aspects in such systems, and to use these models and results to derive optimal testing strategies. The system is assumed to be a system of systems, i.e., a system with discrete components that are themselves systems. Furthermore, the system is 'engineered' in the sense that each node is designed to do something and that we have a mathematical description of that process. In the time-dependent case, the assumption is that we have a general, nonlinear, time-dependent function describing the process. The major results of the project are described in this report. In summary, we developed a sophisticated mathematical framework based on modern probability theory and Bayesian analysis. This framework encompasses all aspects of epistemic uncertainty and easily incorporates steady-state andmore » time-dependent systems. Based on Markov chain, Monte Carlo methods, we devised a computational strategy for general probability density estimation in the steady-state case. This enabled us to compute a distribution of the reliability from which many questions, including confidence, could be addressed. We then extended this to the time domain and implemented procedures to estimate the reliability over time, including the use of the method to predict the reliability at a future time. Finally, we used certain aspects of Bayesian decision analysis to create a novel method for determining an optimal testing strategy, e.g., we can estimate the 'best' location to take the next test to minimize the risk of making a wrong decision about the fitness of a system. We conclude this report by proposing additional fruitful areas of research.« less

[1]  R. Ghanem,et al.  Stochastic Finite Elements: A Spectral Approach , 1990 .

[2]  Habib N. Najm,et al.  Stochastic spectral methods for efficient Bayesian solution of inverse problems , 2005, J. Comput. Phys..

[3]  Bruno O. Shubert,et al.  Random variables and stochastic processes , 1979 .

[4]  Philippe Pierre Pebay,et al.  Bayesian methods for estimating the reliability in complex hierarchical networks (interim report). , 2007 .

[5]  J. Maurice Rojas,et al.  Optimization and NP_R-completeness of certain fewnomials , 2009, SNC '09.

[6]  W. T. Martin,et al.  The Orthogonal Development of Non-Linear Functionals in Series of Fourier-Hermite Functionals , 1947 .

[7]  Finn V. Jensen,et al.  Bayesian Networks and Decision Graphs , 2001, Statistics for Engineering and Information Science.

[8]  Athanasios Papoulis,et al.  Probability, Random Variables and Stochastic Processes , 1965 .

[9]  Olivier P. Le Maître,et al.  Polynomial chaos expansion for sensitivity analysis , 2009, Reliab. Eng. Syst. Saf..

[10]  M. Zwaan An introduction to hilbert space , 1990 .

[11]  F. James,et al.  Monte Carlo theory and practice , 1980 .

[12]  D. Xiu,et al.  Modeling uncertainty in flow simulations via generalized polynomial chaos , 2003 .

[13]  Mircea Grigoriu,et al.  Convergence properties of polynomial chaos approximations for L2 random variables. , 2007 .

[14]  L. L. Cam,et al.  Asymptotic Methods In Statistical Decision Theory , 1986 .

[15]  Shizuo Kakutani,et al.  Spectral Analysis of Stationary Gaussian Processes , 1961 .

[16]  R. A. Silverman,et al.  Introductory Real Analysis , 1972 .

[17]  Michael I. Jordan Graphical Models , 2003 .

[18]  J. Rosenthal A First Look at Rigorous Probability Theory , 2000 .

[19]  Jordan Stoyanov,et al.  Krein condition in probabilistic moment problems , 2000 .

[20]  F. Trèves Topological vector spaces, distributions and kernels , 1967 .

[21]  W. Rudin Real and complex analysis , 1968 .

[22]  Allan Benjamin,et al.  A probabilistic approach to uncertainty quantification with limited information , 2003, Reliab. Eng. Syst. Saf..

[23]  P. K. Sarkar,et al.  A comparative study of Pseudo and Quasi random sequences for the solution intergral equations , 1987 .

[24]  S. Fomin,et al.  Elements of the Theory of Functions and Functional Analysis , 1961 .

[25]  J. M. Rojas,et al.  Computational algebraic geometry for statistical modeling FY09Q2 progress. , 2009 .

[26]  Habib N. Najm,et al.  Dimensionality reduction and polynomial chaos acceleration of Bayesian inference in inverse problems , 2008, J. Comput. Phys..

[27]  Immanuel M. Bomze A functional analytic approach to statistical experiments , 1990 .

[28]  R. A. Waller,et al.  Bayesian reliability analysis of complex series/parallel systems of binomial subsystems and components , 1990 .

[29]  W. Press,et al.  Numerical Recipes: The Art of Scientific Computing , 1987 .

[30]  N. Wiener The Homogeneous Chaos , 1938 .

[31]  J. Berger Statistical Decision Theory and Bayesian Analysis , 1988 .

[32]  Roger G. Ghanem,et al.  On the construction and analysis of stochastic models: Characterization and propagation of the errors associated with limited data , 2006, J. Comput. Phys..

[33]  L. E. Clarke,et al.  Probability and Measure , 1980 .

[34]  Christoph Schwab,et al.  Karhunen-Loève approximation of random fields by generalized fast multipole methods , 2006, J. Comput. Phys..

[35]  Harry F. Martz,et al.  Bayesian reliability analysis of series systems of binomial subsystems and components , 1988 .

[36]  M. Rosenblatt Remarks on a Multivariate Transformation , 1952 .

[37]  Aarnout Brombacher,et al.  Probability... , 2009, Qual. Reliab. Eng. Int..

[38]  Irene A. Stegun,et al.  Handbook of Mathematical Functions. , 1966 .

[39]  Peter Green,et al.  Markov chain Monte Carlo in Practice , 1996 .

[40]  A. V. D. Vaart,et al.  Asymptotic Statistics: Frontmatter , 1998 .