![]() ![]() Another example is that of a space frame with all the supports released for FX, FY or FZ.Ī math precision error is caused when numerical instabilities occur in the matrix inversion process. For example, a 2D structure (frame in the XY plane) which is defined as a SPACE FRAME with pinned supports and subjected to a force in the Z direction will topple over about the X-axis. Global Instability - These are caused when the supports of the structure are such that they cannot offer any resistance to sliding or overturning of the structure in one or more directions.Such a column has no capacity to transfer shears or moments from the superstructure to the supports. A framed structure with columns and beams where the columns are defined as "TRUSS" members.Member Release: Members released at both ends for any of the following degrees of freedom (FX, FY, FZ and MX) will be subjected to this problem.Local instability - A local instability is a condition where the fixity conditions at the end(s) of a member are such as to cause an instability in the member about one or more degrees of freedom.There are a variety of modeling problems which can give rise to instability conditions. Instability problems can occur due to two primary reasons. Modeling and Numerical Instability Problems Global coordinate axes are a common datum established for all idealized elements so that element forces and displacements may be related to a common frame of reference. Local coordinate axes are assigned to each individual element and are oriented such that computing effort for element stiffness matrices are generalized and minimized. Two types of coordinate systems are used in the generation of the required matrices and are referred to as local and global systems.If the member is defined as truss member (i.e., carrying only axial forces) then only the three degrees (translational) of freedom are considered at each node. If torsional or bending properties are defined for any member, six degrees of freedom are considered at each node (i.e., three translational and three rotational) in the generation of relevant matrices. Internal and external loads acting on each node are in equilibrium.These plate and solid elements are referred to as "elements" in the manual. A solid element is a four-to-eight- noded, three dimensional element. A plate element is a three or four noded planar element having variable thickness.From this point these beam members are referred to as "members" in the manual. They may also be subjected to shear and bending in two arbitrary perpendicular planes, and they may also be subjected to torsion. A beam member is a longitudinal structural member having a constant, doubly symmetric or near-doubly symmetric cross section along its length.These loads may be both forces and moments which may act in any specified direction. The assemblage is loaded and reacted by concentrated loads acting at the nodes. The structure is idealized into an assembly of beam, plate and solid type elements joined together at their vertices (nodes).For a complete analysis of the structure, the necessary matrices are generated on the basis of the following assumptions: ![]()
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