Load Control: Difference between revisions

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(Created page with '{{CommandManualMenu}} This command is used to construct a Newmark integrator object. {| | style="background:yellow; color:black; width:800px" | '''integrator LoadControl $la...')
 
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| style="background:yellow; color:black; width:800px" | '''integrator LoadControl $lambda <$numIter $minIter $maxIter>'''
| style="background:yellow; color:black; width:800px" | '''integrator LoadControl $lambda <$numIter $minLambda $maxLambda>'''
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NOTES:
NOTES:
The change in applied loads that this causes depends on the active load patterns (those load patterns not set constant) and the loads in the load patterns. If the only active loads acting on the domain are in load patterns with a Linear time series with a factor of 1.0, this integrator is the same as the classical load control method.
# The change in applied loads that this causes depends on the active load patterns (those load patterns not set constant) and the loads in the load patterns. If the only active loads acting on the domain are in load patterns with a Linear time series with a factor of 1.0, this integrator is the same as the classical load control method.
 
# The optional arguments are supplied to speed up the step size in cases where convergence is too fast and slow down the step size in cases where convergence is too slow.


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Revision as of 01:54, 11 March 2010




This command is used to construct a Newmark integrator object.

integrator LoadControl $lambda <$numIter $minLambda $maxLambda>

$lambda <math>\lambda</math> factor
$numIter the number of iterations the user would like to occur in the solution algorithm. Optional, default = 1.0.
$minLambda the min stepsize the user will allow. optional, defualt = <math>\lambda_{min} = \lambda</math>
$maxLambda the max stepsize the user will allow. optional, default = <math>\lambda_{max} = \lambda</math>

NOTES:

  1. The change in applied loads that this causes depends on the active load patterns (those load patterns not set constant) and the loads in the load patterns. If the only active loads acting on the domain are in load patterns with a Linear time series with a factor of 1.0, this integrator is the same as the classical load control method.
  2. The optional arguments are supplied to speed up the step size in cases where convergence is too fast and slow down the step size in cases where convergence is too slow.

EXAMPLE:


integrator LoadControl 0.1;



THEORY:

In Load Control the time in the domain is set to <math>t + \lambda_{t+1}</math> where,

<math> \lambda_{t+1} = \max \left ( \lambda_{min}, \min \left ( \lambda_{max}, \frac{\text{numIter}}{\text{lastNumIter}} \lambda_{t} \right ) \right ) </math>



Code Developed by: fmk