Probability bounds analysis
Probability bounds analysis (PBA) is a collection of methods of uncertainty propagation for making qualitative and quantitative calculations in the face of uncertainties of various kinds. It is used to project partial information about random variables and other quantities through mathematical expressions. For instance, it computes sure bounds on the distribution of a sum, product, or more complex function, given only sure bounds on the distributions of the inputs. Such bounds are called probability boxes, and constrain cumulative probability distributions (rather than densities or mass functions).
This bounding approach permits analysts to make calculations without requiring overly precise assumptions about parameter values, dependence among variables, or even distribution shape. Probability bounds analysis is essentially a combination of the methods of standard interval analysis and classical probability theory. Probability bounds analysis gives the same answer as interval analysis does when only range information is available. It also gives the same answers as Monte Carlo simulation does when information is abundant enough to precisely specify input distributions and their dependencies. Thus, it is a generalization of both interval analysis and probability theory.
The diverse methods comprising probability bounds analysis provide algorithms to evaluate mathematical expressions when there is uncertainty about the input values, their dependencies, or even the form of mathematical expression itself. The calculations yield results that are guaranteed to enclose all possible distributions of the output variable if the input p-boxes were also sure to enclose their respective distributions. In some cases, a calculated p-box will also be best-possible in the sense that the bounds could be no tighter without excluding some of the possible distributions.
P-boxes are usually merely bounds on possible distributions. The bounds often also enclose distributions that are not themselves possible. For instance, the set of probability distributions that could result from adding random values without the independence assumption from two (precise) distributions is generally a proper subset of all the distributions enclosed by the p-box computed for the sum. That is, there are distributions within the output p-box that could not arise under any dependence between the two input distributions. The output p-box will, however, always contain all distributions that are possible, so long as the input p-boxes were sure to enclose their respective underlying distributions. This property often suffices for use in risk analysis and other fields requiring calculations under uncertainty.
History of bounding probability
The idea of bounding probability has a very long tradition throughout the history of probability theory. Indeed, in 1854 George Boole used the notion of interval bounds on probability in his The Laws of Thought.[1][2] Also dating from the latter half of the 19th century, the inequality attributed to Chebyshev described bounds on a distribution when only the mean and variance of the variable are known, and the related inequality attributed to Markov found bounds on a positive variable when only the mean is known. Kyburg[3] reviewed the history of interval probabilities and traced the development of the critical ideas through the 20th century, including the important notion of incomparable probabilities favored by Keynes. Of particular note is Fréchet's derivation in the 1930s of bounds on calculations involving total probabilities without dependence assumptions. Bounding probabilities has continued to the present day (e.g., Walley's theory of imprecise probability.[4])
The methods of probability bounds analysis that could be routinely used in risk assessments were developed in the 1980s. Hailperin[2] described a computational scheme for bounding logical calculations extending the ideas of Boole. Yager[5] described the elementary procedures by which bounds on convolutions can be computed under an assumption of independence. At about the same time, Makarov,[6] and independently, Rüschendorf[7] solved the problem, originally posed by Kolmogorov, of how to find the upper and lower bounds for the probability distribution of a sum of random variables whose marginal distributions, but not their joint distribution, are known. Frank et al.[8] generalized the result of Makarov and expressed it in terms of copulas. Since that time, formulas and algorithms for sums have been generalized and extended to differences, products, quotients and other binary and unary functions under various dependence assumptions.[9][10][11][12][13][14]
Arithmetic expressions
Arithmetic expressions involving operations such as additions, subtractions, multiplications, divisions, minima, maxima, powers, exponentials, logarithms, square roots, absolute values, etc., are commonly used in risk analyses and uncertainty modeling. Convolution is the operation of finding the probability distribution of a sum of independent random variables specified by probability distributions. We can extend the term to finding distributions of other mathematical functions (products, differences, quotients, and more complex functions) and other assumptions about the intervariable dependencies. There are convenient algorithms for computing these generalized convolutions under a variety of assumptions about the dependencies among the inputs.[5][9][10][14]
Mathematical details
Let 𝔻 denote the space of distribution functions on the real numbers ℝ, i.e., 𝔻 = {D | D : ℝ → [0,1], D(x) ≤ D(y) whenever x < y, for all x, y ∈ ℝ}, and let 𝕀 denote the set of real intervals, i.e., 𝕀 = {i | i = [i1, i2], i1 ≤ i2, i1, i2 ∈ ℝ}. Then a p-box is a quintuple {F, F, m, v, F}, where F, F ∈ 𝔻, while m, v ∈ 𝕀, and F ⊆ 𝔻. This quintuple denotes the set of distribution functions F ∈ F ⊆ 𝔻 such that F(x) ≤ F(x) ≤ F(x) for all x ∈ ℝ}, and the mean and variance of F are in the intervals m and v respectively.
If F is a distribution function and B is a p-box, the notation F ∈ B means that F is an element of B = {B1, B2, [m1,m2], [v1,v2], B}, that is, B2(x) ≤ F(x) ≤ B1(x), for all x ∈ ℝ, E(F) ∈ [m1,m2], V(F) ∈ [v1,v2], and F ∈ B. We sometimes say F is inside B. In some cases, there may be no information about the moments or distribution family other than what is encoded in the two distribution functions that constitute the edges of the p-box. Then the quintuple representing the p-box {B1, B2, [−∞,∞], [0,∞], 𝔻} can be denoted more compactly as [B1, B2]. This notation harkens to that of intervals on the real line, except that the endpoints are distributions rather than points.
The notation X ~ F denotes the fact that X∈ℝ is a random variable governed by the distribution function F, that is, F = F(x):ℝ→[0,1]:x→Pr(X≤x). Let us generalize the tilde notation for use with p-boxes. We will write X ~ B to mean that X is a random variable whose distribution function is unknown except that it is inside B. Thus, X ~ F ∈ B can be contracted to X ~ B without mentioning the distribution function explicitly.
If X and Y are independent random variables with distributions F and G respectively, then X + Y = Z ~ H given by
- H(z) = ∫ z=x+y F(x) G(y) dz = ∫
F(x) G(z − x) dx = F * G.
This operation is called a convolution on F and G. The analogous operation on p-boxes is straightforward for sums. Suppose
- X ~ A = [A1, A2] and
- Y ~ B = [B1, B2].
If X and Y are stochastically independent, then the distribution of Z=X+Y is inside the p-box
- [A1 * B1, A2 * B2].
Finding bounds on the distribution of sums Z = X + Y without making any assumption about the dependence between X and Y is actually easier than the problem assuming independence. Makarov[6][8][9] showed that
- Z ~ [ supx+y=z max(F(x) + G(y) − 1, 0), infx+y=z min(F(x) + G(y), 1) ].
These bounds are implied by the Fréchet–Hoeffding copula bounds. The problem can also be solved using the methods of mathematical programming.[13]
The convolution under the intermediate assumption that X and Y have positive dependence is likewise easy to compute, as is the convolution under the extreme assumptions of perfect positive or perfect negative dependency between X and Y.[14]
Generalized convolutions for other operations such as subtraction, multiplication, division, etc., can be derived using transformations. For instance, p-box subtraction A − B can be defined as A + (−B), where the negative of a p-box B=[B1, B2] is [B2(−x), B1(−x)].
Logical expressions
Logical or Boolean expressions involving conjunctions (AND operations), disjunctions (OR operations), exclusive disjunctions, equivalences, conditionals, etc. arise in the analysis of fault trees and event trees common in risk assessments. If the probabilities of events are characterized by intervals, as suggested by Boole[1] and Keynes[3] among others, these binary operations are straightforward to evaluate. For example, if the probability of an event A is in the interval P(A) = a = [0.2, 0.25], and the probability of the event B is in P(B) = b = [0.1, 0.3], then the probability of the conjunction is surely in the interval
- P(A & B) = a × b
- = [0.2, 0.25] × [0.1, 0.3]
- = [0.2 × 0.1, 0.25 × 0.3]
- = [0.02, 0.075]
so long as A and B can be assumed to be independent events. If they are not independent, we can still bound the conjunction using the classical Fréchet inequality. In this case, we can infer at least that the probability of the joint event A & B is surely within the interval
- P(A & B) = env(max(0, a+b−1), min(a, b))
- = env(max(0, [0.2, 0.25]+[0.1, 0.3]−1), min([0.2, 0.25], [0.1, 0.3]))
- = env([max(0, 0.2+0.1–1), max(0, 0.25+0.3–1)], [min(0.2,0.1), min(0.25, 0.3)])
- = env([0,0], [0.1, 0.25])
- = [0, 0.25]
where env([x1,x2], [y1,y2]) is [min(x1,y1), max(x2,y2)]. Likewise, the probability of the disjunction is surely in the interval
- P(A v B) = a + b − a × b = 1 − (1 − a) × (1 − b)
- = 1 − (1 − [0.2, 0.25]) × (1 − [0.1, 0.3])
- = 1 − [0.75, 0.8] × [0.7, 0.9]
- = 1 − [0.525, 0.72]
- = [0.28, 0.475]
if A and B are independent events. If they are not independent, the Fréchet inequality bounds the disjunction
- P(A v B) = env(max(a, b), min(1, a + b))
- = env(max([0.2, 0.25], [0.1, 0.3]), min(1, [0.2, 0.25] + [0.1, 0.3]))
- = env([0.2, 0.3], [0.3, 0.55])
- = [0.2, 0.55].
It is also possible to compute interval bounds on the conjunction or disjunction under other assumptions about the dependence between A and B. For instance, one might assume they are positively dependent, in which case the resulting interval is not as tight as the answer assuming independence but tighter than the answer given by the Fréchet inequality. Comparable calculations are used for other logical functions such as negation, exclusive disjunction, etc. When the Boolean expression to be evaluated becomes complex, it may be necessary to evaluate it using the methods of mathematical programming[2] to get best-possible bounds on the expression. If the probabilities of the events are characterized by probability distributions or p-boxes rather than intervals, then analogous calculations can be done to obtain distributional or p-box results characterizing the probability of the top event.
Magnitude comparisons
The probability that an uncertain number represented by a p-box D is less than zero is the interval Pr(D < 0) = [F(0), F̅(0)], where F̅(0) is the left bound of the probability box D and F(0) is its right bound, both evaluated at zero. Two uncertain numbers represented by probability boxes may then be compared for numerical magnitude with the following encodings:
- A < B = Pr(A − B < 0),
- A > B = Pr(B − A < 0),
- A ≤ B = Pr(A − B ≤ 0), and
- A ≥ B = Pr(B − A ≤ 0).
Thus the probability that A is less than B is the same as the probability that their difference is less than zero, and this probability can be said to be the value of the expression A < B.
Like arithmetic and logical operations, these magnitude comparisons generally depend on the stochastic dependence between A and B, and the subtraction in the encoding should reflect that dependence. If their dependence is unknown, the difference can be computed without making any assumption using the Fréchet operation.
Sampling-based computation
Some analysts[15][16][17][18][19][20] use sampling-based approaches to computing probability bounds, including Monte Carlo simulation, Latin hypercube methods or importance sampling. These approaches cannot assure mathematical rigor in the result because such simulation methods are approximations, although their performance can generally be improved simply by increasing the number of replications in the simulation. Thus, unlike the analytical theorems or methods based on mathematical programming, sampling-based calculations usually cannot produce verified computations. However, sampling-based methods can be very useful in addressing a variety of problems which are computationally difficult to solve analytically or even to rigorously bound. One important example is the use of Cauchy-deviate sampling to avoid the curse of dimensionality in propagating interval uncertainty through high-dimensional problems.[21]
Relationship to other uncertainty propagation approaches
PBA belongs to a class of methods that use imprecise probabilities to simultaneously represent aleatoric and epistemic uncertainties. PBA is a generalization of both interval analysis and probabilistic convolution such as is commonly implemented with Monte Carlo simulation. PBA is also closely related to robust Bayes analysis, which is sometimes called Bayesian sensitivity analysis. PBA is an alternative to second-order Monte Carlo simulation.
Applications
P-boxes and probability bounds analysis have been used in many applications spanning many disciplines in engineering and environmental science, including:
- Engineering design[22]
- Expert elicitation[23]
- Analysis of species sensitivity distributions[24]
- Sensitivity analysis in aerospace engineering of the buckling load of the frontskirt of the Ariane 5 launcher[25]
- ODE models of chemical reactor dynamics[26][27]
- Pharmacokinetic variability of inhaled VOCs[28]
- Groundwater modeling[29]
- Bounding failure probability for series systems[30]
- Heavy metal contamination in soil at an ironworks brownfield[31][32]
- Uncertainty propagation for salinity risk models[33]
- Power supply system safety assessment[34]
- Contaminated land risk assessment[35]
- Engineered systems for drinking water treatment[36]
- Computing soil screening levels[37]
- Human health and ecological risk analysis by the U.S. EPA of PCB contamination at the Housatonic River Superfund site[38]
- Environmental assessment for the Calcasieu Estuary Superfund site[39]
- Aerospace engineering for supersonic nozzle thrust[40]
- Verification and validation in scientific computation for engineering problems[41]
- Toxicity to small mammals of environmental mercury contamination[42]
- Modeling travel time of pollution in groundwater[43]
- Reliability analysis[44]
- Endangered species assessment for reintroduction of Leadbeater’s Possum[45]
- Exposure of insectivorous birds to an agricultural pesticide[46]
- Climate change projections[31][47][48]
- Waiting time in queuing systems[49]
- Extinction risk analysis for spotted owl on the Olympic Peninsula[50]
- Biosecurity against introduction of invasive species or agricultural pests[51]
- Finite-element structural analysis[52][53]
- Cost estimates[54]
- Nuclear stockpile certification[55]
- Fracking risks to water pollution[56]
See also
- Probability box
- Robust Bayes analysis
- Imprecise probability
- Second-order Monte Carlo simulation
- Monte Carlo simulation
- Interval analysis
- Probability theory
- Risk analysis
References
- ↑ 1.0 1.1 Boole, George (1854). An Investigation of the Laws of Thought on which are Founded the Mathematical Theories of Logic and Probabilities. London: Walton and Maberly.
- ↑ 2.0 2.1 2.2 Hailperin, Theodore (1986). Boole's Logic and Probability. Amsterdam: North-Holland. ISBN 0-444-11037-2.
- ↑ 3.0 3.1 Kyburg, H.E., Jr. (1999). Interval valued probabilities. SIPTA Documention on Imprecise Probability.
- ↑ Walley, Peter (1991). Statistical Reasoning with Imprecise Probabilities. London: Chapman and Hall. ISBN 0-412-28660-2.
- ↑ 5.0 5.1 Yager, R.R. (1986). Arithmetic and other operations on Dempster–Shafer structures. International Journal of Man-machine Studies 25: 357–366.
- ↑ 6.0 6.1 Makarov, G.D. (1981). Estimates for the distribution function of a sum of two random variables when the marginal distributions are fixed. Theory of Probability and Its Applications 26: 803–806.
- ↑ Rüschendorf, L. (1982). Random variables with maximum sums. Advances in Applied Probability 14: 623–632.
- ↑ 8.0 8.1 Frank, M.J., R.B. Nelsen and B. Schweizer (1987). Best-possible bounds for the distribution of a sum—a problem of Kolmogorov. Probability Theory and Related Fields 74: 199–211.
- ↑ 9.0 9.1 9.2 Williamson, R.C., and T. Downs (1990). Probabilistic arithmetic I: Numerical methods for calculating convolutions and dependency bounds. International Journal of Approximate Reasoning 4: 89–158.
- ↑ 10.0 10.1 Ferson, S., V. Kreinovich, L. Ginzburg, D.S. Myers, and K. Sentz. (2003). Constructing Probability Boxes and Dempster–Shafer Structures. SAND2002-4015. Sandia National Laboratories, Albuquerque, NM.
- ↑ Berleant, D. (1993). Automatically verified reasoning with both intervals and probability density functions. Interval Computations 1993 (2) : 48–70.
- ↑ Berleant, D., G. Anderson, and C. Goodman-Strauss (2008). Arithmetic on bounded families of distributions: a DEnv algorithm tutorial. Pages 183–210 in Knowledge Processing with Interval and Soft Computing, edited by C. Hu, R.B. Kearfott, A. de Korvin and V. Kreinovich, Springer (ISBN 978-1-84800-325-5).
- ↑ 13.0 13.1 Berleant, D., and C. Goodman-Strauss (1998). Bounding the results of arithmetic operations on random variables of unknown dependency using intervals. Reliable Computing 4: 147–165.
- ↑ 14.0 14.1 14.2 Ferson, S., R. Nelsen, J. Hajagos, D. Berleant, J. Zhang, W.T. Tucker, L. Ginzburg and W.L. Oberkampf (2004). Dependence in Probabilistic Modeling, Dempster–Shafer Theory, and Probability Bounds Analysis. Sandia National Laboratories, SAND2004-3072, Albuquerque, NM.
- ↑ Alvarez, D. A., 2006. On the calculation of the bounds of probability of events using infinite random sets. International Journal of Approximate Reasoning 43: 241–267.
- ↑ Baraldi, P., Popescu, I. C., Zio, E., 2008. Predicting the time to failure of a randomly degrading component by a hybrid Monte Carlo and possibilistic method. IEEE Proc. International Conference on Prognostics and Health Management.
- ↑ Batarseh, O. G., Wang, Y., 2008. Reliable simulation with input uncertainties using an interval-based approach. IEEE Proc. Winter Simulation Conference.
- ↑ Roy, Christopher J., and Michael S. Balch (2012). A holistic approach to uncertainty quantification with application to supersonic nozzle thrust. International Journal for Uncertainty Quantification [in press].
- ↑ Zhang, H., Mullen, R. L., Muhanna, R. L. (2010). Interval Monte Carlo methods for structural reliability. Structural Safety 32: 183–190.
- ↑ Zhang, H., Dai, H., Beer, M., Wang, W. (2012). Structural reliability analysis on the basis of small samples: an interval quasi-Monte Carlo method. Mechanical Systems and Signal Processing [in press].
- ↑ Trejo, R., Kreinovich, V. (2001). Error estimations for indirect measurements: randomized vs. deterministic algorithms for ‘black-box’ programs. Handbook on Randomized Computing, S. Rajasekaran, P. Pardalos, J. Reif, and J. Rolim (eds.), Kluwer, 673–729.
- ↑ Aughenbaugh, J. M., and C.J.J. Paredis (2007). Probability bounds analysis as a general approach to sensitivity analysis in decision making under uncertainty. SAE 2007 Transactions Journal of Passenger Cars: Mechanical Systems, (Section 6) 116: 1325–1339, SAE International, Warrendale, Pennsylvania.
- ↑ Flander, L., W. Dixon, M. McBride, and M. Burgman. (2012). Facilitated expert judgment of environmental risks: acquiring and analysing imprecise data. International Journal of Risk Assessment and Management 16: 199–212.
- ↑ Dixon, W.J. (2007). The use of Probability Bounds Analysis for Characterising and Propagating Uncertainty in Species Sensitivity Distributions. Technical Report Series No. 163, Arthur Rylah Institute for Environmental Research, Department of Sustainability and Environment. Heidelberg, Victoria, Australia.
- ↑ Oberguggenberger, M., J. King and B. Schmelzer (2007). Imprecise probability methods for sensitivity analysis in engineering. Proceedings of the 5th International Symposium on Imprecise Probability: Theories and Applications, Prague, Czech Republic.
- ↑ Enszer, J.A., Y. Lin, S. Ferson, G.F. Corliss and M.A. Stadtherr (2011). Probability bounds analysis for nonlinear dynamic process models. AIChE Journal 57: 404–422.
- ↑ Enszer, Joshua Alan, (2010). Verified Probability Bound Analysis for Dynamic Nonlinear Systems. Dissertation, University of Notre Dame.
- ↑ Nong, A., and K. Krishnan (2007). Estimation of interindividual pharmacokinetic variability factor for inhaled volatile organic chemicals using a probability-bounds approach. Regulatory Toxicology and Pharmacology 48: 93–101.
- ↑ Guyonnet, D., F. Blanchard, C. Harpet, Y. Ménard, B. Côme and C. Baudrit (2005). Projet IREA—Traitement des incertitudes en évaluation des risques d'exposition, Annexe B, Cas «Eaux souterraines». Rapport BRGM/RP-54099-FR, Bureau de Recherches Géologiques et Minières, France.
- ↑ Fetz, T., and F. Tonon (2008). Probability bounds for series systems with variables constrained by sets of probability measures. International Journal of Reliability and Safety 2: 309–339. doi:10.1504/IJRS.2008.022079.
- ↑ 31.0 31.1 Augustsson, A., M. Filipsson, T. Öberg, B. Bergbäck (2011). Climate change—an uncertainty factor in risk analysis of contaminated land. Science of the Total Environment 409: 4693–4700.
- ↑ Baudrit, C., D. Guyonnet, H. Baroudi, S. Denys and P. Begassat (2005). Assessment of child exposure to lead on an ironworks brownfield: uncertainty analysis. 9th International FZK/TNO Conference on Contaminated Soil – ConSoil2005, Bordeaux, France, pages 1071–1080.
- ↑ Dixon, W.J. (2007). Uncertainty Propagation in Population Level Salinity Risk Models. Technical Report Technical Report Series No. 164, Arthur Rylah Institute for Environmental Research. Heidelberg, Victoria, Australia
- ↑ Karanki, D.R., H.S. Kushwaha, A.K. Verma, and S. Ajit. (2009). Uncertainty analysis based on probability bounds (p-box) approach in probabilistic safety assessment. Risk Analysis 29: 662–75.
- ↑ Sander, P., B. Bergbäck and T. Öberg (2006). Uncertain numbers and uncertainty in the selection of input distributions—Consequences for a probabilistic risk assessment of contaminated land. Risk Analysis 26: 1363–1375.
- ↑ Minnery, J.G., J.G. Jacangelo, L.I. Boden, D.J. Vorhees and W. Heiger-Bernays (2009). Sensitivity analysis of the pressure-based direct integrity test for membranes used in drinking water treatment. Environmental Science and Technology 43(24): 9419–9424.
- ↑ Regan, H.M., B.E. Sample and S. Ferson (2002). Comparison of deterministic and probabilistic calculation of ecological soil screening levels. Environmental Toxicology and Chemistry 21: 882–890.
- ↑ U.S. Environmental Protection Agency (Region I), GE/Housatonic River Site in New England
- ↑ U.S. Environmental Protection Agency (Region 6 Superfund Program), Calcasieu Estuary Remedial Investigation
- ↑ Roy, C.J., and M.S. Balch (2012). A holistic approach to uncertainty quantification with application to supersonic nozzle thrust. International Journal for Uncertainty Quantification 2: 363-381. doi:10.1615/Int.J.UncertaintyQuantification.2012003562.
- ↑ Oberkampf, W.L., and C. J. Roy. (2010). Verification and Validation in Scientific Computing. Cambridge University Press.
- ↑ Regan, H.M., B.K. Hope, and S. Ferson (2002). Analysis and portrayal of uncertainty in a food web exposure model. Human and Ecological Risk Assessment 8: 1757–1777.
- ↑ Ferson, S., and W.T. Tucker (2004). Reliability of risk analyses for contaminated groundwater. Groundwater Quality Modeling and Management under Uncertainty, edited by S. Mishra, American Society of Civil Engineers Reston, VA.
- ↑ Crespo, L.G., S.P. Kenny, and D.P. Giesy (2012). Reliability analysis of polynomial systems subject to p-box uncertainties. Mechanical Systems and Signal Processing 37: 121–136. doi:10.1016/j.ymssp.2012.08.012
- ↑ Ferson, S., and M. Burgman (1995). Correlations, dependency bounds and extinction risks. Biological Conservation 73: 101–105.
- ↑ Ferson, S., D.R.J. Moore, P.J. Van den Brink, T.L. Estes, K. Gallagher, R. O'Connor and F. Verdonck. (2010). Bounding uncertainty analyses. Pages 89–122 in Application of Uncertainty Analysis to Ecological Risks of Pesticides, edited by W. J. Warren-Hicks and A. Hart. CRC Press, Boca Raton, Florida.
- ↑ Kriegler, E., and H. Held (2005). Utilizing belief functions for the estimation of future climate change. International Journal of Approximate Reasoning 39: 185–209.
- ↑ Kriegler, E. (2005). Imprecise probability analysis for integrated assessment of climate change, Ph.D. dissertation, Universität Potsdam, Germany.
- ↑ Batarseh, O.G.Y., (2010). An Interval Based Approach to Model Input Uncertainty in Discrete-event Simulation. Ph.D. dissertation, University of Central Florida.
- ↑ Goldwasser, L., L. Ginzburg and S. Ferson (2000). Variability and measurement error in extinction risk analysis: the northern spotted owl on the Olympic Peninsula. Pages 169–187 in Quantitative Methods for Conservation Biology, edited by S. Ferson and M. Burgman, Springer-Verlag, New York.
- ↑ Hayes, K.R. (2011). Uncertainty and uncertainty analysis methods: Issues in quantitative and qualitative risk modeling with application to import risk assessment ACERA project (0705). Report Number: EP102467, CSIRO, Hobart, Australia.
- ↑ Zhang, H., R.L. Mullen, and R.L. Muhanna (2010). Finite element structural analysis using imprecise probabilities based on p-box representation. Proceedings of the 4th International Workshop on Reliable Engineering Computing (REC 2010).
- ↑ Zhang, H., R. Mullen, R. Muhanna (2012). Safety Structural Analysis with Probability-Boxes. International Journal of Reliability and Safety 6: 110–129.
- ↑ Mehl, C.H. (2013). P-boxes for cost uncertainty analysis. Mechanical Systems and Signal Processing 37: 253–263. doi:10.1016/j.ymssp.2012.03.014
- ↑ Sentz, K., and S. Ferson (2011). Probabilistic bounding analysis in the quantification of margins and uncertainties. Reliability Engineering and System Safety 96: 1126–1136.
- ↑ Rozell, Daniel J., and Sheldon J. Reaven (2012). Water pollution risk associated with natural gas extraction from the Marcellus Shale. Risk Analysis 32: 1382–1393.
Additional references
- Bernardini, Alberto; Tonon, Fulvio (2010). Bounding Uncertainty in Civil Engineering: Theoretical Background. Berlin: Springer. ISBN 3-642-11189-0.
- Ferson, Scott (2002). RAMAS Risk Calc 4.0 Software : Risk Assessment with Uncertain Numbers. Boca Raton, Florida: Lewis Publishers. ISBN 1-56670-576-2.
- Oberkampf, William L.; Roy, Christopher J. (2010). Verification and Validation in Scientific Computing. New York: Cambridge University Press. ISBN 0-521-11360-1.