Abstract
This paper presents a generalized numerical method which is based on the well-known Mohr method. Static or dynamic stiffness matrices, as well as nodal load vectors for the static case, of non-uniform members are derived for several effects. The method focuses on the effects of resting on variable one- or two-parameter elastic foundations or supported by no foundation; a variable iterative algorithm is developed for computer application of the method. The algorithm enables the non-uniform member to be regarded as a sub-structure. This provides an important advantage to encompass all the variable effects in the stiffness matrix of this sub-structure. Stability and free-vibration analyses of the sub-structure can also be carried out through this method. Parametric and numerical examples are given to verify the accuracy and efficiency of the submitted method.
Original language | English |
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Pages (from-to) | 1373-1384 |
Number of pages | 12 |
Journal | Engineering Structures |
Volume | 27 |
Issue number | 9 |
DOIs | |
Publication status | Published - Aug 2005 |
Keywords
- Arbitrarily variable
- Geometric non-linearity
- Non-uniform member
- Stability and free-vibration analysis
- Stiffness matrix
- Two-parameter elastic foundation