Force-Based Beam-Column Element
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This command is used to construct a force beam element object, which is based on the iterative force formulation, and considers the spread of plasticity along the element.
element forceBeamColumn $eleTag $iNode $jNode $numIntgrPts $secTag $transfTag <-mass $massDens> <-iter $maxIters $tol> <-integration $intType> |
To change the sections along the element length, the following form of command may be used:
element forceBeamColumn $eleTag $iNode $jNode $numIntgrPts -sections $secTag1 $secTag2 ... $transfTag <-mass $massDens> <-iter $maxIters $tol> <-integration $intType> |
Alternative command (kept for backward compatability) is:
element nonlinearBeamColumn $eleTag $iNode $jNode $numIntgrPts $secTag $transfTag <-mass $massDens> <-iter $maxIters $tol> <-integration $intType> |
$eleTag | unique element object tag |
$iNode $jNode | end nodes |
$numIntgrPts | number of integration points along the element. |
$secTag | identifier for previously-defined section object |
$secTag1 $secTag2 ... | $numIntgrPts identifiers of previously-defined section object |
$transfTag | identifier for previously-defined coordinate-transformation (CrdTransf) object |
$massDens | element mass density (per unit length), from which a lumped-mass matrix is formed (optional, default=0.0) |
$maxIters | maximum number of iterations to undertake to satisfy element compatibility (optional, default=10) |
$tol | tolerance for satisfaction of element compatibility (optional, default=10-12) |
$intType | numerical integration type, options are Lobatto, Legendre, Radau, NewtonCotes, Trapezoidal (optional, default= Lobatto) |
NOTE:
- The default integration along the element is based on Gauss-Lobatto quadrature rule (two integration points at the element ends).
- The default element is prismatic, i.e. the beam is represented by the section model identified by $secTag at each integration point.
- The -iter switch enables the iterative form of the flexibility formulation. Note that the iterative form can improve the rate of global convergence at the expense of more local element computation.
- The valid response elements that an element of this type will respond to are:
- force or globalForce
- localForce
- basicForce
- section $sectionNumber $arg1 $arg2 ... (note: $sectionNumer is integer 1 through $numIntegrPts)
- basicDeformation
- plasticDeformation
- inflectionPoint
- tangentDrift
- integrationPoints
- integrationWeights
- Here is a link to the source code to obtain information about the location and weight of the Gauss-Lobatto integration points [1]
EXAMPLE:
element forceBeamColumn 1 2 4 5 8 9; # force beam column element added with tag 1 between nodes 2 and 4 that has 5 integration points, each using section 8, and the element uses geometric transformation 9
FURTHER DOCUMENTATION ON INTEGRATION OPTIONS:
REFERENCES:
- Neuenhofer, Ansgar, FC Filippou. Geometrically Nonlinear Flexibility-Based Frame Finite Element. ASCE Journal of Structural Engineering, Vol. 124, No. 6, June, 1998. ISSN 0733-9445/98/0006-0704-0711. Paper 16537. pp. 704-711.
- Neuenhofer, Ansgar, FC Filippou. Evaluation of Nonlinear Frame Finite-Element Models. ASCE Journal of Structural Engineering, Vol. 123, No. 7, July, 1997. ISSN 0733-9445/97/0007-0958-0966. Paper No. 14157. pp. 958-966.
- Neuenhofer, Ansgar, FC Filippou. ERRATA -- Geometrically Nonlinear Flexibility-Based Frame Finite Element. ASCE Journal of Structural Engineering, Vol. 124, No. 6, June, 1998. ISSN 0733-9445/98/0006-0704-0711. Paper 16537. pp. 704-711.
- Taucer, Fabio F, E Spacone, FC Filippou. A Fiber Beam-Column Element for Seismic Response Analysis of Reinforced Concrete Structures. Report No. UCB/EERC-91/17. Earthquake Engineering Research Center, College of Engineering, University of California, Berkeley. December 1991.
- Spacone, Enrico, V Ciampi, FC Filippou. A Beam Element for Seismic Damage Analysis. Report No. UCB/EERC-92/07. Earthquake Engineering Research Center, College of Engineering, University of California, Berkeley. August 1992.
Code Developed by: Micheal H. Scott, Oregon State University