Modelling under risk and uncertainty : an introduction to statistical, phenomenological and computational methods

書誌事項

Modelling under risk and uncertainty : an introduction to statistical, phenomenological and computational methods

Etienne de Rocquigny

(Wiley series in probability and mathematical statistics)

Wiley, 2012

  • : hbk

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注記

"Dunod"--Cover

Includes bibliographical references and index

内容説明・目次

内容説明

Modelling has permeated virtually all areas of industrial, environmental, economic, bio-medical or civil engineering: yet the use of models for decision-making raises a number of issues to which this book is dedicated: How uncertain is my model ? Is it truly valuable to support decision-making ? What kind of decision can be truly supported and how can I handle residual uncertainty ? How much refined should the mathematical description be, given the true data limitations ? Could the uncertainty be reduced through more data, increased modeling investment or computational budget ? Should it be reduced now or later ? How robust is the analysis or the computational methods involved ? Should / could those methods be more robust ? Does it make sense to handle uncertainty, risk, lack of knowledge, variability or errors altogether ? How reasonable is the choice of probabilistic modeling for rare events ? How rare are the events to be considered ? How far does it make sense to handle extreme events and elaborate confidence figures ? Can I take advantage of expert / phenomenological knowledge to tighten the probabilistic figures ? Are there connex domains that could provide models or inspiration for my problem ? Written by a leader at the crossroads of industry, academia and engineering, and based on decades of multi-disciplinary field experience, Modelling Under Risk and Uncertainty gives a self-consistent introduction to the methods involved by any type of modeling development acknowledging the inevitable uncertainty and associated risks. It goes beyond the "black-box" view that some analysts, modelers, risk experts or statisticians develop on the underlying phenomenology of the environmental or industrial processes, without valuing enough their physical properties and inner modelling potential nor challenging the practical plausibility of mathematical hypotheses; conversely it is also to attract environmental or engineering modellers to better handle model confidence issues through finer statistical and risk analysis material taking advantage of advanced scientific computing, to face new regulations departing from deterministic design or support robust decision-making. Modelling Under Risk and Uncertainty: Addresses a concern of growing interest for large industries, environmentalists or analysts: robust modeling for decision-making in complex systems. Gives new insights into the peculiar mathematical and computational challenges generated by recent industrial safety or environmental control analysis for rare events. Implements decision theory choices differentiating or aggregating the dimensions of risk/aleatory and epistemic uncertainty through a consistent multi-disciplinary set of statistical estimation, physical modelling, robust computation and risk analysis. Provides an original review of the advanced inverse probabilistic approaches for model identification, calibration or data assimilation, key to digest fast-growing multi-physical data acquisition. Illustrated with one favourite pedagogical example crossing natural risk, engineering and economics, developed throughout the book to facilitate the reading and understanding. Supports Master/PhD-level course as well as advanced tutorials for professional training Analysts and researchers in numerical modeling, applied statistics, scientific computing, reliability, advanced engineering, natural risk or environmental science will benefit from this book.

目次

Preface xv Acknowledgements xvii Introduction and reading guide xix Notation xxxiii Acronyms and abbreviations xxxvii 1 Applications and practices of modelling, risk and uncertainty 1 1.1 Protection against natural risk 1 1.1.1 The popular 'initiator/frequency approach' 3 1.1.2 Recent developments towards an 'extended frequency approach' 5 1.2 Engineering design, safety and structural reliability analysis (SRA) 7 1.2.1 The domain of structural reliability 8 1.2.2 Deterministic safety margins and partial safety factors 9 1.2.3 Probabilistic structural reliability analysis 10 1.2.4 Links and differences with natural risk studies 11 1.3 Industrial safety, system reliability and probabilistic risk assessment (PRA) 12 1.3.1 The context of systems analysis 12 1.3.2 Links and differences with structural reliability analysis 14 1.3.3 The case of elaborate PRA (multi-state, dynamic) 16 1.3.4 Integrated probabilistic risk assessment (IPRA) 17 1.4 Modelling under uncertainty in metrology, environmental/sanitary assessment and numerical analysis 20 1.4.1 Uncertainty and sensitivity analysis (UASA) 21 1.4.2 Specificities in metrology/industrial quality control 23 1.4.3 Specificities in environmental/health impact assessment 24 1.4.4 Numerical code qualification (NCQ), calibration and data assimilation 25 1.5 Forecast and time-based modelling in weather, operations research, economics or finance 27 1.6 Conclusion: The scope for generic modelling under risk and uncertainty 28 1.6.1 Similar and dissimilar features in modelling, risk and uncertainty studies 28 1.6.2 Limitations and challenges motivating a unified framework 30 References 31 2 A generic modelling framework 34 2.1 The system under uncertainty 34 2.2 Decisional quantities and goals of modelling under risk and uncertainty 37 2.2.1 The key concept of risk measure or quantity of interest 37 2.2.2 Salient goals of risk/uncertainty studies and decision-making 38 2.3 Modelling under uncertainty: Building separate system and uncertainty models 41 2.3.1 The need to go beyond direct statistics 41 2.3.2 Basic system models 42 2.3.3 Building a direct uncertainty model on variable inputs 45 2.3.4 Developing the underlying epistemic/aleatory structure 46 2.3.5 Summary 49 2.4 Modelling under uncertainty - the general case 50 2.4.1 Phenomenological models under uncertainty and residual model error 50 2.4.2 The model building process 51 2.4.3 Combining system and uncertainty models into an integrated statistical estimation problem 55 2.4.4 The combination of system and uncertainty models: A key information choice 57 2.4.5 The predictive model combining system and uncertainty components 59 2.5 Combining probabilistic and deterministic settings 60 2.5.1 Preliminary comments about the interpretations of probabilistic uncertainty models 60 2.5.2 Mixed deterministic-probabilistic contexts 61 2.6 Computing an appropriate risk measure or quantity of interest and associated sensitivity indices 64 2.6.1 Standard risk measures or q.i. (single-probabilistic) 65 2.6.2 A fundamental case: The conditional expected utility 67 2.6.3 Relationship between risk measures, uncertainty model and actions 68 2.6.4 Double probabilistic risk measures 69 2.6.5 The delicate issue of propagation/numerical uncertainty 71 2.6.6 Importance ranking and sensitivity analysis 71 2.7 Summary: Main steps of the studies and later issues 73 Exercises 74 References 75 3 A generic tutorial example: Natural risk in an industrial installation 77 3.1 Phenomenology and motivation of the example 77 3.1.1 The hydro component 78 3.1.2 The system's reliability component 80 3.1.3 The economic component 83 3.1.4 Uncertain inputs, data and expertise available 84 3.2 A short introduction to gradual illustrative modelling steps 86 3.2.1 Step one: Natural risk standard statistics 87 3.2.2 Step two: Mixing statistics and a QRA model 89 3.2.3 Step three: Uncertainty treatment of a physical/engineering model (SRA) 91 3.2.4 Step four: Mixing SRA and QRA 91 3.2.5 Step five: Level-2 uncertainty study on mixed SRA-QRA model 94 3.2.6 Step six: Calibration of the hydro component and updating of risk measure 96 3.2.7 Step seven: Economic assessment and optimisation under risk and/or uncertainty 97 3.3 Summary of the example 99 Exercises 101 References 101 4 Understanding natures of uncertainty, risk margins and time bases for probabilistic decision-making 102 4.1 Natures of uncertainty: Theoretical debates and practical implementation 103 4.1.1 Defining uncertainty - ambiguity about the reference 103 4.1.2 Risk vs. uncertainty - an impractical distinction 104 4.1.3 The aleatory/epistemic distinction and the issue of reducibility 105 4.1.4 Variability or uncertainty - the need for careful system specification 107 4.1.5 Other distinctions 109 4.2 Understanding the impact on margins of deterministic vs. probabilistic formulations 110 4.2.1 Understanding probabilistic averaging, dependence issues and deterministic maximisation and in the linear case 110 4.2.2 Understanding safety factors and quantiles in the monotonous case 114 4.2.3 Probability limitations, paradoxes of the maximal entropy principle 117 4.2.4 Deterministic settings and interval computation - uses and limitations 119 4.2.5 Conclusive comments on the use of probabilistic and deterministic risk measures 120 4.3 Handling time-cumulated risk measures through frequencies and probabilities 121 4.3.1 The underlying time basis of the state of the system 121 4.3.2 Understanding frequency vs. probability 124 4.3.3 Fundamental risk measures defined over a period of interest 126 4.3.4 Handling a time process and associated simplifications 128 4.3.5 Modelling rare events through extreme value theory 130 4.4 Choosing an adequate risk measure - decision-theory aspects 135 4.4.1 The salient goal involved 135 4.4.2 Theoretical debate and interpretations about the risk measure when selecting between risky alternatives (or controlling compliance with a risk target) 136 4.4.3 The choice of financial risk measures 137 4.4.4 The challenges associated with using double-probabilistic or conditional probabilistic risk measures 138 4.4.5 Summary recommendations 140 Exercises 140 References 141 5 Direct statistical estimation techniques 143 5.1 The general issue 143 5.2 Introducing estimation techniques on independent samples 147 5.2.1 Estimation basics 147 5.2.2 Goodness-of-fit and model selection techniques 150 5.2.3 A non-parametric method: Kernel modelling 154 5.2.4 Estimating physical variables in the flood example 157 5.2.5 Discrete events and time-based statistical models (frequencies, reliability models, time series) 159 5.2.6 Encoding phenomenological knowledge and physical constraints inside the choice of input distributions 163 5.3 Modelling dependence 165 5.3.1 Linear correlations 165 5.3.2 Rank correlations 168 5.3.3 Copula model 172 5.3.4 Multi-dimensional non-parametric modelling 173 5.3.5 Physical dependence modelling and concluding comments 174 5.4 Controlling epistemic uncertainty through classical or Bayesian estimators 175 5.4.1 Epistemic uncertainty in the classical approach 175 5.4.2 Classical approach for Gaussian uncertainty models (small samples) 177 5.4.3 Asymptotic covariance for large samples 179 5.4.4 Bootstrap and resampling techniques 185 5.4.5 Bayesian-physical settings (small samples with expert judgement) 186 5.5 Understanding rare probabilities and extreme value statistical modelling 194 5.5.1 The issue of extrapolating beyond data - advantages and limitations of the extreme value theory 194 5.5.2 The significance of extremely low probabilities 201 Exercises 203 References 204 6 Combined model estimation through inverse techniques 206 6.1 Introducing inverse techniques 206 6.1.1 Handling calibration data 206 6.1.2 Motivations for inverse modelling and associated literature 208 6.1.3 Key distinctions between the algorithms: The representation of time and uncertainty 210 6.2 One-dimensional introduction of the gradual inverse algorithms 216 6.2.1 Direct least square calibration with two alternative interpretations 216 6.2.2 Bayesian updating, identification and calibration 223 6.2.3 An alternative identification model with intrinsic uncertainty 225 6.2.4 Comparison of the algorithms 227 6.2.5 Illustrations in the flood example 229 6.3 The general structure of inverse algorithms: Residuals, identifiability, estimators, sensitivity and epistemic uncertainty 233 6.3.1 The general estimation problem 233 6.3.2 Relationship between observational data and predictive outputs for decision-making 233 6.3.3 Common features to the distributions and estimation problems associated to the general structure 236 6.3.4 Handling residuals and the issue of model uncertainty 238 6.3.5 Additional comments on the model-building process 242 6.3.6 Identifiability 243 6.3.7 Importance factors and estimation accuracy 249 6.4 Specificities for parameter identification, calibration or data assimilation algorithms 251 6.4.1 The BLUE algorithm for linear Gaussian parameter identification 251 6.4.2 An extension with unknown variance: Multidimensional model calibration 254 6.4.3 Generalisations to non-linear calibration 255 6.4.4 Bayesian multidimensional model updating 256 6.4.5 Dynamic data assimilation 257 6.5 Intrinsic variability identification 260 6.5.1 A general formulation 260 6.5.2 Linearised Gaussian case 261 6.5.3 Non-linear Gaussian extensions 263 6.5.4 Moment methods 264 6.5.5 Recent algorithms and research fields 264 6.6 Conclusion: The modelling process and open statistical and computing challenges 267 Exercises 267 References 268 7 Computational methods for risk and uncertainty propagation 271 7.1 Classifying the risk measure computational issues 272 7.1.1 Risk measures in relation to conditional and combined uncertainty distributions 273 7.1.2 Expectation-based single probabilistic risk measures 275 7.1.3 Simplified integration of sub-parts with discrete inputs 277 7.1.4 Non-expectation based single probabilistic risk measures 280 7.1.5 Other risk measures (double probabilistic, mixed deterministic-probabilistic) 281 7.2 The generic Monte-Carlo simulation method and associated error control 283 7.2.1 Undertaking Monte-Carlo simulation on a computer 283 7.2.2 Dual interpretation and probabilistic properties of Monte-Carlo simulation 285 7.2.3 Control of propagation uncertainty: Asymptotic results 290 7.2.4 Control of propagation uncertainty: Robust results for quantiles (Wilks formula) 292 7.2.5 Sampling double-probabilistic risk measures 298 7.2.6 Sampling mixed deterministic-probabilistic measures 299 7.3 Classical alternatives to direct Monte-Carlo sampling 299 7.3.1 Overview of the computation alternatives to MCS 299 7.3.2 Taylor approximation (linear or polynomial system models) 300 7.3.3 Numerical integration 305 7.3.4 Accelerated sampling (or variance reduction) 306 7.3.5 Reliability methods (FORM-SORM and derived methods) 312 7.3.6 Polynomial chaos and stochastic developments 316 7.3.7 Response surface or meta-models 316 7.4 Monotony, regularity and robust risk measure computation 317 7.4.1 Simple examples of monotonous behaviours 317 7.4.2 Direct consequences of monotony for computing the risk measure 319 7.4.3 Robust computation of exceedance probability in the monotonous case 322 7.4.4 Use of other forms of system model regularity 329 7.5 Sensitivity analysis and importance ranking 330 7.5.1 Elementary indices and importance measures and their equivalence in linear system models 330 7.5.2 Sobol sensitivity indices 336 7.5.3 Specificities of Boolean input/output events - importance measures in risk assessment 339 7.5.4 Concluding remarks and further research 341 7.6 Numerical challenges, distributed computing and use of direct or adjoint differentiation of codes 342 Exercises 342 References 343 8 Optimising under uncertainty: Economics and computational challenges 347 8.1 Getting the costs inside risk modelling - from engineering economics to financial modelling 347 8.1.1 Moving to costs as output variables of interest - elementary engineering economics 347 8.1.2 Costs of uncertainty and the value of information 351 8.1.3 The expected utility approach for risk aversion 353 8.1.4 Non-linear transformations 355 8.1.5 Robust design and alternatives mixing cost expectation and variance inside the optimisation procedure 356 8.2 The role of time - cash flows and associated risk measures 358 8.2.1 Costs over a time period - the cash flow model 358 8.2.2 The issue of discounting 361 8.2.3 Valuing time flexibility of decision-making and stochastic optimisation 362 8.3 Computational challenges associated to optimisation 366 8.3.1 Static optimisation (utility-based) 367 8.3.2 Stochastic dynamic programming 368 8.3.3 Computation and robustness challenges 368 8.4 The promise of high performance computing 369 8.4.1 The computational load of risk and uncertainty modelling 369 8.4.2 The potential of high-performance computing 371 Exercises 372 References 372 9 Conclusion: Perspectives of modelling in the context of risk and uncertainty and further research 374 9.1 Open scientific challenges 374 9.2 Challenges involved by the dissemination of advanced modelling in the context of risk and uncertainty 377 References 377 10 Annexes 378 10.1 Annex 1 - refresher on probabilities and statistical modelling of uncertainty 378 10.1.1 Modelling through a random variable 378 10.1.2 The impact of data and the estimation uncertainty 380 10.1.3 Continuous probabilistic distributions 382 10.1.4 Dependence and stationarity 382 10.1.5 Non-statistical approach of probabilistic modelling 384 10.2 Annex 2 - comments about the probabilistic foundations of the uncertainty models 386 10.2.1 The overall space of system states and the output space 386 10.2.2 Correspondence to the Kaplan/Garrick risk analysis triplets 389 10.2.3 The model and model input space 389 10.2.4 Estimating the uncertainty model through direct data 391 10.2.5 Model calibration and estimation through indirect data and inversion techniques 393 10.3 Annex 3 - introductory reflections on the sources of macroscopic uncertainty 394 10.4 Annex 4 - details about the pedagogical example 397 10.4.1 Data samples 397 10.4.2 Reference probabilistic model for the hydro component 399 10.4.3 Systems reliability component - expert information on elementary failure probabilities 399 10.4.4 Economic component - cost functions and probabilistic model 403 10.4.5 Detailed results on various steps 404 10.5 Annex 5 - detailed mathematical demonstrations 414 10.5.1 Basic results about vector random variables and matrices 414 10.5.2 Differentiation results and solutions of quadratic likelihood maximisation 415 10.5.3 Proof of the Wilks formula 419 10.5.4 Complements on the definition and chaining of monotony 420 10.5.5 Proofs on level-2 quantiles of monotonous system models 422 10.5.6 Proofs on the estimator of adaptive Monte-Carlo under monotony (section 7.4.3) 423 References 426 Epilogue 427 Index 429

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