risk analysis and target reliability for...
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Risk Analysis and Target Reliability for Bridges
Andrzej S. Nowak, Ph.D. University of Nebraska-Lincoln
Disclaimer
The contents of this report reflect the views of the authors, who are responsible for the facts and the accuracy of the information presented herein. This document is disseminated under the sponsorship of the U.S. Department of Transportation’s University Transportation Centers Program, in the interest of information exchange. The U.S. Government assumes no liability for the contents or use thereof.
Outline Problem Statement
Load and Resistance Models
Reliability Analysis Procedure
Selection of the Target Reliability
Load and Resistance Factors
Problem Statement 585,000 highway bridges in USA
30-35% are inadequate
10-15% are structurally deficient
How to use the available limited resources?
Needs New design – how to design with
optimum life cycle costs?
Existing structures – how to assess the actual loads and capacity? How to predict the remaining life?
Select a rational safety margin
Uncertainties Loads (natural and created)
Material properties
Load carrying capacity (resistance)
Basic requirement:
Load effect (Q) < Resistance (R)
Safety margin
R – Q > 0
Reliability Index, b
Basic Questions:
• How can we measure safety of a structure?
• How safe is safe enough? What is the target reliability?
• How can we implement the optimum safety level?
Safety Factors • Allowable stress
• Load factors
• Load combination factors
• Resistance factors
Load Factor
Resistance Factor
Code Calibration Procedure
• Select representative structures
• Develop statistical models for loads
• Develop statistical models for resistance
• Develop/select reliability analysis procedure
• Determine the target reliability index
• Determine load and resistance factors
Bridge Loads • Dead load
• Live load (static and dynamic)
• Environmental loads (wind, snow, earthquake, temperature, ice)
• Special loads (vehicle and vessel collision, fire, explosion)
Two Trucks Side by Side
Video Recordings of Traffic Jam Situations FHWA Data
• Multiple-presence of trucks occupying three lanes
• One lane is almost exclusively occupied by trucks
Video 1, time: 00:18:36
Resistance (Load Carrying Capacity)
• Material tests • Component tests • Diagnostic tests • Analytical simulations • Proof load tests
Reliability Index, b For a linear limit state function, g = R – Q = 0, and
R and Q both being normal random variables
2
Q
2
R
QR
b
R = mean resistance
Q = mean load
R = standard deviation of
resistance
Q = standard deviation of load
Reliability Index and Probability of Failure
PF b 10-1 1.28
10-2 2.33
10-3 3.09
10-4 3.71
10-5 4.26
10-6 4.75
10-7 5.19
10-8 5.62
10-9 5.99
Reliability Analysis Procedures
• Closed-form equations – accurate results only for special cases
• First Order Reliability Methods (FORM), reliability index is calculated by iterations
• Second Order Reliability Methods (SORM), and other advanced procedures
• Monte Carlo method - values of random variables are simulated (generated by computer), accuracy depends on the number of computer simulations
What is Optimum Reliability?
• If reliability index is too small – there are problems, even structural failures
• If reliability index is too large – the structures are too expensive
Selection Criteria for the Target Reliability
• Consequences of failure
• Economic analysis
• Past practice
• Human perception
• Social/political decisions
Target Reliability Index – Major Considerations
• Primary and secondary components
• Multiple and single load paths (redundancy)
• Element and system reliability
• New design and existing structure
• Ductile and brittle materials and components
• Important, historical and ordinary structures
Types of Components
• Primary component – its failure causes failure of other components (or total collapse)
• Secondary component – its failure does not affect performance of other components
Examples of the Target Reliability Indices for Bridge Components
Primary component (multiple load path)
bT = 3.5
Primary component (single load path)
bT = 5.0
Secondary component
bT = 2.0
bT for Strength vs. Service Limit States
• Consequences of exceeding the limit state are different
• For decompression, bT = 1
• For deflection, bT = 0
• For fatigue, bT = 1-2
System vs. Component
• Structures are systems made of components
• Failure of a component may not mean failure of the system
• Ductile and brittle components
• Correlation between components
Structural Systems
• Series systems – weakest link systems, to be avoided
• Parallel systems – components share the load, preferred systems
• Avoid brittle materials and elements, use ductile materials and elements
The weakest link determines the strength
37
38
Parallel system
Golden Gate Bridge, San Francisco built in 1933-1935, span of 1280 m
Examples of the Target Reliability Indices for Bridges - Materials
For steel, reinforced concrete, prestressed
concrete girders,
bT = 3.5
For sawn wood bridge components,
bT = 2.0
For girder bridge as a system (all materials),
bT = 5.5-6.5
Operational Importance
• Regional and national economy
• Emergency situations (floods,
earthquakes, fires, hurricanes)
Historical Value
• Historical structures can have a special value for the society
• Preservation of the general features
New Design vs. Existing Structure
• For a new design, reliability can be increased with little extra cost
• For an existing structure, any strengthening can
be prohibitively expensive • Current practice accepts lower reliability levels for
existing structures
Reliability of Connections
• For a bolted connection, the reliability can be increased with negligible extra cost (extra bolts)
• For a steel component, the increase of reliability is much more costly (heavier section)
• Target reliability index for bolts is bT = 5-6, while for beams, bT = 3-4
How can we implement the target reliability?
• Design and evaluation of existing bridges – by load and resistance factors, safety margins in the design, fool-proof design
• Construction – quality control of materials and work skill, fool-proof construction
• Proper use and operation, maintenance, preventive repairs
Recommended bT
TIME
PERIOD
PRIMARY COMPONENTS SECONDARY
COMPONENTS Single Path Multiple Path
5 years 3.50 3.00 2.25
10 years 3.75 3.25 2.50
50 years 4.00 3.50 2.75
Conclusions • Target reliability index varies depending on
consequences of failure, costs, and other considerations
• For new design, bT can be significantly higher than for evaluation of existing structures
• For historical structures, in addition, bT
depends on social and political considerations
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