A comparison of methods for representing sparsely sampled random quantities.

Romero, Vicente J.; Swiler, Laura Painton; Urbina, Angel; Mullins, Joshua

doi:10.2172/1096268

Cited by 9 publications

(12 citation statements)

References 19 publications

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“…Investigations in [26,31,32] have concluded 95/90 TIs to be preferable to many other UQ methods tried or critically assessed for estimating, from very sparse sample data, conservative but not overly conservative bounds on the central 95% of response. The other methods tried or critically evaluated include bootstrapping [33], optimized four-parameter Johnson-family distribution fit to the response samples [34], nonparametric kernel density estimation specifically designed for sparse data [35], nonparametric cubic spline PDF fit to the data based on maximum likelihood [36], and Bayesian sparse-data approaches [37].…”

Section: Uncertainty Processing and Interpretation Of Failure Pressurmentioning

confidence: 99%

“…This is not the case here; each input stress-strain function of a given material is sampled repeatedly 1 Confidence levels of 75% or 85% are often adequate to manage risk, especially if conservatism from other sources exists in the analysis or results-such as when several sources of uncertainty are present where each involves sparse data conservatively treated with the TI method. Studies in [32] and [42] indicate that when more than one dominant or influential uncertainty sources are sparsely sampled and represented conservatively with TI confidence levels of say >70%, when the conservatively represented uncertainties are combined in linear propagation or aggregation, the individual conservative biases compound to yield substantially greater than 70% confidence of conservative bias in the combined uncertainty estimate.…”

Section: Uncertainty Processing and Interpretation Of Failure Pressurmentioning

confidence: 99%

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Propagating Stress-Strain Curve Variability in Multi-Material Problems: Temperature-Dependent Material Tests to Plasticity Models to Structural Failure Predictions

Romero¹,

Black²,

Orient³

et al. 2020

Engineering Failure Analysis

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This chapter presents a practical methodology for characterizing and propagating the effects of temperature-dependent material strength and failure-criteria variability to structural model predictions. The application involves a cylindrical canister ("can") heated and pressurized to failure. Temperature dependence and material sample-to-sample stochastic variability are inferred from very limited experimental data of a few replicate uniaxial tension tests at each of seven temperatures spanning the 800°C temperature excursion experienced by the can, for each of several stainless steel alloys that make up the can. The load-displacement curves from the material tests are used to determine effective temperature-dependent stress-strain relationships in ductile-metal plasticity models used in can-level model predictions. Particularly challenging aspects of the problem are the appropriate inference, representation, and propagation of temperature dependence and material stochastic variability from just a few experimental data curves at a few temperatures (as sparse discrete realizations or samples from a random field of temperature-dependent stress-strain behavior), for multiple such materials involved in the problem. Currently unique methods are demonstrated that are relatively simple and effective. 1 references [1-7] describes aspects of the associated activities, including experiments, modeling and simulation, code and calculation verification, and advanced model validation and uncertainty quantification (UQ) methods.The modeling and verification, validation, and uncertainty quantification (VVUQ) activities were performed under a multiyear "abnormal thermalmechanical breach" (T-M breach) task [1] of a Predictive Capability Assessment Project (PCAP) in the Verification & Validation (V&V) subelement of the U.S. Dept. of Energy Advanced Simulation and Computing (ASC) program. The goal of the PCAP T-M breach task was to assess the error and quantify the uncertainty in modeling the thermal-chemical-mechanical response and weld-related breach failure of sealed canisters ("cans") weakened by high temperatures and pressurized by heat-induced pyrolysis of foam. The planned outcome of the PCAP T-M breach task was to measure improvements in prediction accuracy over time as the models and computer platforms became more capable.The Sandia Weapon System Engineering and Assessment Technology Campaign (WSEAT) program supported the project by conducting material characterization tests and validation experiments [2] (see Figure 1). This partnership provided an opportunity to develop a fully integrated process from design of experiments through model validation assessment, with uncertainty reduced as much as possible and propagated through the process.Breach failures were expected to occur, and in the tests, they did occur, at the circumferential perimeter (laser) weld that joins the top lid to the can sidewalls. This is because the weld thickness is significantly less than the can lid and sidewalls (see Figure 2), and the tests/cans of...

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Section: Uncertainty Processing and Interpretation Of Failure Pressurmentioning

confidence: 99%

Section: Uncertainty Processing and Interpretation Of Failure Pressurmentioning

confidence: 99%

Propagating Stress-Strain Curve Variability in Multi-Material Problems: Temperature-Dependent Material Tests to Plasticity Models to Structural Failure Predictions

Romero¹,

Black²,

Orient³

et al. 2020

Engineering Failure Analysis

Self Cite

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show abstract

“…1) The normal TI method (even though the underlying distribution is not normal or lognormal) gave better coverage probabilities than the bootstrap methods (i.e., about 93%) for smaller sample sizes (8)(9)(10)(11)(12)(13)(14)(15)(16). So, the normal TI method may be a good choice if one is willing to trade off slight underestimation of coverage probability (i.e., 93% instead of 95%) with significantly better B-basis values or lower relative mean margins in comparison to nonparametric method (e.g., about 24-15% for normal TI vs 47-29% for nonparametric).…”

Section: Gamma Distribution Identified As Lognormalmentioning

confidence: 99%

“…Romero et al [13][14][15] performed similar studies to test the performances of the normal TI method, the Pradlwarter-Schuëller kernel density method, the Johnson method, and the nonparametric method. These methods were used to construct two-sided 90% confidence bounds on the probability density function (PDF), ranging between 0.025 and 0.975 percentiles for normal, triangular, and uniform distributions.…”

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confidence: 99%

Comparison of Methods for Calculating B-Basis Crack Growth Life Using Limited Tests

2016

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Large sampling uncertainty is generally introduced in the calculation of a low percentile of fatigue crack growth life due to a small number of coupon tests. It is often desirable to estimate a low percentile (for example, 10th percentile) with a certain coverage probability (for example, 95%) using the confidence bound approach. An equally competing objective is not to have overly conservative bounds.The performance of two bootstrap-based methods are investigated for calculating a one-sided 95% confidence bound on a low percentile of lognormal and gamma fatigue crack growth life distributions. A comparison is also made with the classical tolerance interval method and nonparametric (Hanson-Koopmans) method. These confidence bounds methods are tested to estimate B-basis fatigue crack growth design life using material properties estimated from coupon test samples ranging from 8 to 64.

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“…The likely error that accompanies sparse sampling has a bias toward underestimating the true full-population variance (at least for distribution types and combinations investigated in [9] - [11]). This is unconservative and therefore undesirable for many engineering purposes.…”

Section: Incorporating Multiple Stress-strain Curves Of Materials Varimentioning

confidence: 99%

UQ and V&V techniques applied to experiments and simulations of heated pipes pressurized to failure

Romero

Dempsey

Antoun

2014

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This report demonstrates versatile and practical model validation and uncertainty quantification techniques applied to the accuracy assessment of a computational model of heated steel pipes pressurized to failure. The "Real Space" validation methodology segregates aleatory and epistemic uncertainties to form straightforward model validation metrics especially suited for assessing models to be used in the analysis of performance and safety margins. The methodology handles difficulties associated with representing and propagating interval and/or probabilistic uncertainties from multiple correlated and uncorrelated sources in the experiments and simulations including:  material variability characterized by non-parametric random functions (discrete temperature dependent stress-strain curves);  very limited (sparse) experimental data at the coupon testing level for material characterization and at the pipe-test validation level;  boundary condition reconstruction uncertainties from spatially sparse sensor data;  normalization of pipe experimental responses for measured input-condition differences among tests and for random and systematic uncertainties in measurement/processing/inference of experimental inputs and outputs;  numerical solution uncertainty from model discretization and solver effects.

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A comparison of methods for representing sparsely sampled random quantities.

Cited by 9 publications

References 19 publications

Propagating Stress-Strain Curve Variability in Multi-Material Problems: Temperature-Dependent Material Tests to Plasticity Models to Structural Failure Predictions

Propagating Stress-Strain Curve Variability in Multi-Material Problems: Temperature-Dependent Material Tests to Plasticity Models to Structural Failure Predictions

Comparison of Methods for Calculating B-Basis Crack Growth Life Using Limited Tests

UQ and V&V techniques applied to experiments and simulations of heated pipes pressurized to failure

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