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Probabilistic Re-Analysis Using Monte Carlo Simulation
Efstratios Nikolaidis, Sirine Salem, Farizal, Zissimos Mourelatos April 2008
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Definition and Significance
Probabilistic design optimization Find design variables To maximize average utility RBDO To minimize loss function s. t. system failure probability does not exceed allowable value Often average utility or system failure probability must be calculated by Monte Carlo simulation. Vibratory response of a dynamic system: failure domain consists of multiple disjoint regions
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Definition and Significance
Challenge: High computational cost Optimization requires probabilistic analyses of many alternative designs Each probabilistic analysis requires many deterministic analyses Expensive to perform deterministic analysis of a practical model
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Definition and Significance
Deterministic FEA Excitation at engine mounts Vibratory door displacement Monte Carlo Simulation (10,000 replications) Reliability analysis Probability of failure Search for optimum ( Monte Carlo Simulations) RBDO Optimum
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Outline Objectives and Scope Probabilistic Re-analysis Example
RBDO problem formulation Method description Sensitivity analysis Example Preliminary Design of Internal Combustion Engine Conclusion Conclusion
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1. Objectives and Scope Present probabilistic re-analysis approach (PRA) for RBDO Estimate reliability of many designs by performing a single Monte-Carlo simulation Integrate PRA in a methodology for RBDO Demonstrate efficacy Design variables are random; can control their average values
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2. Probabilistic Re-analysis
RBDO problem formulation: Find average values of random design variables To minimize cost function So that
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Reducing computational cost by using Probabilistic Re-analysis
Select a sampling PDF and perform one Monte Carlo simulation Save sample values that caused failure (failure set) Estimate failure probability of all alternative designs by using failure set in step 2 Sampling PDF x2 Alternative designs Failure set Failure region x1
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Estimation of failure probability
Confidence in failure probability estimate Similar equations are available for average value of a function of design variables (for example utility) Values xi are calculated from one Monte-Carlo simulation, same values are used to find failure probabilities of all design alternatives PDF when mean values of design variables = µX Sampling PDF
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Sensitivity analysis Analytical expression
Can be calculated very efficiently because it is easy to differentiate PDF of a random variable
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RBDO with Probabilistic Re-analysis
Find X To minimize s. t. Solution requires only n deterministic analyses
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RBDO with Probabilistic Re-analysis
Feasible Region Increased Performance x2 x1 Optimum Failure subset MAXIMIZING the objective function Iso-cost curves
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Efficient Probabilistic Re-analysis: Capabilities
Calculates system failure probabilities of many design alternatives using results of a single Monte-Carlo simulation Does not require calculation of the performance function of modified designs – reuses calculated values of performance function from a single simulation. Cost of RBDO cost of a single simulation Non intrusive, easy to program If PDF of design variables is continuous then system failure probability varies smoothly as function of design variables Highly effective when design variables have large variability
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Challenges Works only when all design variables are random
Requires sample that fills the space of design variables Cost of single simulation increases with design variables
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3. Example: RBDO of Internal Combustion Engine
Preliminary design of flat head internal combustion engine from thermodynamic point of view Find average bore, inner and outer diameters, compression ratio and RPM To maximize specific power S. t. system failure probability ≤pfall (0.4% to 0.67%) Failure: any violation of nine packaging and functional requirements
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Design variables (all variables normal)
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Exhaust valve diameter
Sampling PDF Average Values Bore 82.13 Intake valve diameter 35.84 Exhaust valve diameter 30.33 Compression ratio 9.34 RPM 5.31
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Effect of average bore on system failure probability (100,000 replications)
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Specific Power and Probability of Failure
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Comparison of efficiencies of standard Monte Carlo and PRA (narrower CI means higher efficiency of the method)
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Observations PRA found an optimum design almost identical as RBDO using FORM (Liang 2007). PRA converged to same optimum from different initial designs PRA underestimated consistently system failure probability by 5% to 11%. 95% confidence intervals have half width = 23% to 28% of system failure probability Confidence interval from PRA is 50% wider than that of standard Monte Carlo. This means that PRA needs 225,000 replications to yield results with same accuracy as standard Monte Carlo with 100,000 replications.
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4. Conclusion Presented efficient methodology for RBDO using Monte Carlo simulation Solves RBDO problems using a single Monte Carlo simulation Calculates sensitivity derivatives of system failure probability Limitation: methodology, in its present form, works only when all design variables are random
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