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Reliability and Redundancy Analysis of Structural Systems with Application to Highway Bridges

Reliability and Redundancy Analysis of Structural Systems with Application to Highway Bridges. Michel Ghosn The City College of New York / CUNY. Contributors. Prof. Joan Ramon Casas UPC Construction Engineering Ms. Feng Miao Mr. Giorgio Anitori. Introduction.

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Reliability and Redundancy Analysis of Structural Systems with Application to Highway Bridges

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  1. Reliability and Redundancy Analysis of Structural Systemswith Application to Highway Bridges Michel Ghosn The City College of New York / CUNY

  2. Contributors • Prof. Joan Ramon Casas UPC Construction Engineering • Ms. Feng Miao • Mr. Giorgio Anitori

  3. Introduction • Structural systems are designed on a member by member basis. • Little consideration is provided to the effects of a local failure on system safety. • Local failures may be due to overloading or loss of member capacity from fatigue fracture, deterioration, or accidents such as an impact or a blast. • Local failure of one element may result in the failure of another creating a chain reaction that progresses throughout the system leading to a catastrophic progressive collapse.

  4. I-35W over Mississippi River (2007) Truss bridge Collapse due to initial failure of gusset plate

  5. I-35 Gusset Plate

  6. I-40 Bridge in Oklahoma (2002) Bridge collapse due to barge impact

  7. Route 19 Overpass, Quebec (2006) Box-Girder bridge collapse due to corrosion

  8. Corroded Bridge Deck

  9. Oklahoma City Bombing (1995)

  10. Structural Redundancy Bridges survive initial damage due to system redundancy and reserve safety Collisions Fatigue Fracture Seismic Damage

  11. Definitions • Redundancy is the ability of a system to continue to carry loads after the overloading of members. • Robustness is the ability of a structural system to survive the loss of a member and continue to carry some load. • Progressive Collapse is the spread of an initial local failure from element to element resulting, eventually, in the collapse of an entire structure or a disproportionately large part of it.

  12. Structural Performance

  13. Deterministic Criteria • Ultimate Limit State • Functionality Limit State • Damaged Limit State

  14. State of the Art • New guidelines to have high levels of redundancy in buildings. • Criteria are based on deterministic analyses. • Uncertainties in estimating member strengths and system capacity as well as applied load intensity and distribution justify the use of probabilistic methods.

  15. Structural Reliability

  16. Reliability Index, b • Reliability index, b, is defined in terms of the Gaussian Prob. function: • If R and S follow Gaussian distributions: b function of means and standard deviations

  17. Reliability Index, b

  18. Lognormal Probability Model • If the load and resistance follow Lognormal distributions then the reliability index is approximately b function of coefficients of variation: V =stand. Dev./ mean

  19. System Reliability • Probability of structural collapse, P(C), due to different damage scenarios, L, caused by multiple hazards, E: • P(E) =probability of occurrence of hazard E • P(L|E) = probability of local failure, L, given E • P(C|LE) is probability of collapse given L due to E

  20. Safety Criteria • The probability of bridge collapse must be limited to an acceptable level: • Alternatively, the criteria can be set in terms of the reliability index, β, defined as:

  21. Option 1 to Reduce Risk • Reduce exposure to hazards: lower P(E) • Protect columns from collisions through barriers • Set columns at large distances from roadway to avoid crashes • Increase bridge height to avoid collisions with deck • Build away from earthquake faults • Use steel connection details that are not prone to fatigue and fracture failures • Increase security surveillance to avoid intentional sabotage

  22. Option 2 to Reduce Risk • Reduce member failure given a hazard: P(L|E) • Increase reliability of connection details by using different connection types, advanced materials, or improved welding, splicing and anchoring techniques • Strengthen columns that may be subject to collisions or sabotage using steel jacketing or FRP wrapping • Increase capacity of columns and critical members to improve their ability to resist unusual loads

  23. Option 3 to Reduce Risk • Avoid collapse if one member fails: P(C|LE) • Use structural configurations that have high levels of redundancy. • Appropriately spaced large number of columns • Trusses that are not statically determinate • Ensure that all the members contributing to a mode of failure are conservatively designed • to pick up the load shed by member that fails in brittle mode • to pick up additional load applied if member that initiates sequence fails in a ductile mode.

  24. Types of Failures

  25. Issues with Reliability Analysis • Realistic structural models involve: • Large numbers of random variables • Multiple failure modes • Low probability of failure for members, 10-4 • Probability of failure for systems, 10-6 • Computational effort

  26. Finite Element Analysis

  27. Reliability Analysis Methods • Monte Carlo Simulation (MCS) • First Order Reliability Method (FORM) • Response Surface Method (RSM) • Latin Hypercube Simulation (LHS) • Genetic Search Algorithms (GA) • Subset Simulation (SS)

  28. Monte Carlo Simulation (MCS) • Random sampling to artificially simulate a large number of experiments and observe the results. • Can solve problems with complex failure regions. • Needs large numbers of simulations for accurate results.

  29. Probab. of failure = Number of cases in failure domain/ total number of cases Monte Carlo Simulation (MCS)

  30. First Order Reliability Method • First Order Reliability Method (FORM) approximates limit-state function with a first-order function. • Reliability index is the minimum distance between the mean value to the failure function. • If limit state function is linear

  31. First Order Reliability Method Use optimization techniques to find design point = shortest distance between Z=0 to origin of normalized space

  32. Response Surface Method (RSM) • RSM approximates the unknown explicit limit state function by a polynomial function. • A second order polynomial is most often used for the response surface. • The function is obtained by perturbation of variables near design point.

  33. Response Surface Method (RSM)

  34. Subset Simulation (SS) • If F denote the failure domain. Subset failure regions Fi are arranged to form a decreasing sequence of failure events: • The probability of failure Pf can be represented as the probability of falling in the final subset given that on the previous step, the event belonged to subset Fm-1:

  35. Subset Simulation (SS) • By recursively repeating the process, the following equation is obtained: • During the simulation, conditional samples are generated from specially designed Markov Chains so that they gradually populate each intermediate failure region until they cover the whole failure domain. .

  36. Illustration of Subset Simulation Procedure bi are chosen “adaptively” so that the conditional probabilities are approximately to a pre-set value, p0. (e.g. p0=0.1)

  37. Illustration of Subset Simulation Procedure

  38. Development of Reliability Criteria • Analyze a large number of representative bridge configurations. • Find the reliability indexes for those that have shown good system performance. • Use these reliability index values as criteria for future designs • Find the corresponding deterministic criteria

  39. Input Data for Reliability Analysis • Dead loads • Bending moment resistance: • Composite steel beams • Prestr. concrete beams • Concrete T-beams

  40. Live Load Simulation • Maximum of N events. • 75-yr design life • 5-yr rating cycle • ADTT = 5000 = 1000 = 100 Bin I Bin II Repeat for N loading events

  41. Simulated vs. Measured Single event Two-lane 100-ft span

  42. Cumulative Distribution

  43. Maximum Load Effect Max. 5-yr event Two-lane 100-ft span

  44. Reliability-Based Criteria for Bridges • Based on bridge member reliability • Corresponding system safety, redundancy and robustness criteria:

  45. Deterministic Criteria • Ultimate Limit State • Functionality Limit State • Damaged Limit State

  46. Design Criteria • Apply system factor during the design process to reflect level of redundancy • fs <1.0 increases the system reliability of designs with low levels of redundancy. • fs > 1.0 allows members of systems with high redundancy to have lower capacities.

  47. Example Ps/Concrete Bridge 100-ft simple span, 6 beams at 8-ft

  48. Example Ps/Concrete Bridge

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