Axisymmetric elements

Abaqus includes two libraries of solid elements, CAX and CGAX, whose geometry is axisymmetric (bodies of revolution) and which can be subjected to axially symmetric loading conditions. In addition, CGAX elements support torsion loading.

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Axisymmetric solid element library

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CGAX elements will be referred to as generalized axisymmetric elements, and CAX elements as torsionless axisymmetric elements. In both cases, the body of revolution is generated by revolving a plane cross-section about an axis (the symmetry axis) and is readily described in cylindrical polar coordinates r, z, and θ. The radial and axial coordinates of a point on this cross-section are denoted by r and z, respectively. At θ=0, the radial and axial coordinates coincide with the global Cartesian X- and Y-coordinates.

If the loading consists of radial and axial components that are independent of θ and the material is either isotropic or orthotropic, with θ being a principal material direction, the displacement at any point will only have radial (ur) and axial (uz) components and the only stress components that will be nonzero are σrr, σzz, σθθ, and σrz. Moreover, the deformation of any rz plane completely defines the state of strain and stress in the body. Consequently, the geometric model is described by discretizing the reference cross-section at θ=0.

If one allows for a circumferential component of loading (which is independent of θ) and for general material anisotropy, displacements and stress fields become three-dimensional, but the problem remains axisymmetric in the sense that the solution does not vary as a function of θ and the deformation of the reference rz cross-section still characterizes the deformation in the entire body. The motion at any point will have, in addition to the aforementioned radial and axial displacements, a twist ϕ (in radians) about the z-axis, which is independent of θ.

This section describes the formulation of the generalized axisymmetric elements. The formulation of the torsionless axisymmetric elements is a subset of this formulation.