Products: ABAQUS/Standard ABAQUS/Explicit ABAQUS/CAE
A linear elastic material model:
The total stress is defined from the total elastic strain as
where is the total stress (“true,” or Cauchy stress in finite-strain problems), is the fourth-order elasticity tensor, and is the total elastic strain (log strain in finite-strain problems). Do not use the linear elastic material definition when the elastic strains may become large; use a hyperelastic model instead. Even in finite-strain problems the elastic strains should still be small (less than 5%).
The elastic response of a viscoelastic material ( Time domain viscoelasticity, Section 17.7.1) can be specified by defining either the instantaneous response or the long-term response of the material. To define the instantaneous response, experiments to determine the elastic constants have to be performed within time spans much shorter than the characteristic relaxation time of the material.
*ELASTIC, MODULI=INSTANTANEOUS
Property module: material editor: Mechanical Elasticity Elastic : Moduli time scale (for viscoelasticity) : Instantaneous
If, on the other hand, the long-term elastic response is used, data from experiments have to be collected after time spans much longer than the characteristic relaxation time of the viscoelastic material. Long-term elastic response is the default elastic material behavior.
*ELASTIC, MODULI=LONG TERM
Property module: material editor: Mechanical Elasticity Elastic : Moduli time scale (for viscoelasticity) : Long-term
Directional dependence of linear elasticityDepending on the number of symmetry planes for the elastic properties, a material can be classified as either isotropic (an infinite number of symmetry planes passing through every point) or anisotropic (no symmetry planes). Some materials have a restricted number of symmetry planes passing through every point; for example, orthotropic materials have two orthogonal symmetry planes for the elastic properties. The number of independent components of the elasticity tensor depends on such symmetry properties. You define the level of anisotropy and method of defining the elastic properties, as described below. If the material is anisotropic, a local orientation ( Orientations, Section 2.2.5) must be used to define the direction of anisotropy.
Stability of a linear elastic materialLinear elastic materials must satisfy the conditions of material or Drucker stability (see the discussion on material stability in Hyperelastic behavior of rubberlike materials, Section 17.5.1). Stability requires that the tensor be positive definite, which leads to certain restrictions on the values of the elastic constants. The stress-strain relations for several different classes of material symmetries are given below. The appropriate restrictions on the elastic constants stemming from the stability criterion are also given.
Defining isotropic elasticityThe simplest form of linear elasticity is the isotropic case, and the stress-strain relationship is given by
The elastic properties are completely defined by giving the Young's modulus, E , and the Poisson's ratio, . The shear modulus, G , can be expressed in terms of E and as . These parameters can be given as functions of temperature and of other predefined fields, if necessary.
*ELASTIC, TYPE=ISOTROPIC
Property module: material editor: Mechanical Elasticity Elastic : Type : Isotropic
The stability criterion requires that , , and . Values of Poisson's ratio approaching 0.5 result in nearly incompressible behavior. With the exception of plane stress cases (including membranes and shells) or beams and trusses, such values generally require the use of “hybrid” elements in ABAQUS/Standard and generate high frequency noise and result in excessively small stable time increments in ABAQUS/Explicit.
Defining orthotropic elasticity by specifying the engineering constantsLinear elasticity in an orthotropic material is most easily defined by giving the “engineering constants”: the three moduli , , ; Poisson's ratios , , ; and the shear moduli , , and associated with the material's principal directions. These moduli define the elastic compliance according to
The quantity has the physical interpretation of the Poisson's ratio that characterizes the transverse strain in the j -direction, when the material is stressed in the i-direction. In general, is not equal to : they are related by =. The engineering constants can also be given as functions of temperature and other predefined fields, if necessary.
*ELASTIC, TYPE=ENGINEERING CONSTANTS
Property module: material editor: Mechanical Elasticity Elastic : Type : Engineering Constants
Material stability requires
When the left-hand side of the inequality approaches zero, the material exhibits incompressible behavior. Using the relations =, the second, third, and fourth restrictions in the above set can also be expressed as
Defining transversely isotropic elasticityA special subclass of orthotropy is transverse isotropy, which is characterized by a plane of isotropy at every point in the material. Assuming the 1–2 plane to be the plane of isotropy at every point, transverse isotropy requires that ==, ==, ==, and ==, where p and t stand for “in-plane” and “transverse,” respectively. Thus, while has the physical interpretation of the Poisson's ratio that characterizes the strain in the plane of isotropy resulting from stress normal to it, characterizes the transverse strain in the direction normal to the plane of isotropy resulting from stress in the plane of isotropy. In general, the quantities and are not equal and are related by =. The stress-strain laws reduce to
where = and the total number of independent constants is only five.*ELASTIC, TYPE=ENGINEERING CONSTANTS
Property module: material editor: Mechanical Elasticity Elastic : Type : Engineering Constants
In the transversely isotropic case the stability relations for orthotropic elasticity simplify to
Defining orthotropic elasticity in plane stressUnder plane stress conditions, such as in a shell element, only the values of , , , , , and are required to define an orthotropic material. (In all of the plane stress elements in ABAQUS the surface is the surface of plane stress, so that the plane stress condition is .) The shear moduli and are included because they may be required for modeling transverse shear deformation in a shell. The Poisson's ratio is implicitly given as . In this case the stress-strain relations for the in-plane components of the stress and strain are of the form
*ELASTIC, TYPE=LAMINA
Property module: material editor: Mechanical Elasticity Elastic : Type : Lamina
Material stability for plane stress requires
Defining orthotropic elasticity by specifying the terms in the elastic stiffness matrixLinear elasticity in an orthotropic material can also be defined by giving the nine independent elastic stiffness parameters, as functions of temperature and other predefined fields, if necessary. In this case the stress-strain relations are of the form
For an orthotropic material the engineering constants define the matrix asWhen the material stiffness parameters (the ) are given directly, ABAQUS imposes the constraint for the plane stress case to reduce the material's stiffness matrix as required.
*ELASTIC, TYPE=ORTHOTROPIC
Property module: material editor: Mechanical Elasticity Elastic : Type : Orthotropic
The restrictions on the elastic constants due to material stability are
The last relation leads toThese restrictions in terms of the elastic stiffness parameters are equivalent to the restrictions in terms of the “engineering constants.” Incompressible behavior results when the left-hand side of the inequality approaches zero.
Defining fully anisotropic elasticityFor fully anisotropic elasticity 21 independent elastic stiffness parameters are needed. The stress-strain relations are as follows:
When the material stiffness parameters (the ) are given directly, ABAQUS imposes the constraint for the plane stress case to reduce the material's stiffness matrix as required.
*ELASTIC, TYPE=ANISOTROPIC
Property module: material editor: Mechanical Elasticity Elastic : Type : Anisotropic
The restrictions imposed upon the elastic constants by stability requirements are too complex to express in terms of simple equations. However, the requirement that is positive definite requires that all of the eigenvalues of the elasticity matrix be positive.
Defining orthotropic elasticity for warping elementsFor two-dimensional meshed models of solid cross-section Timoshenko beam elements modeled with warping elements (see Meshed beam cross-sections, Section 10.4.1), ABAQUS offers a linear elastic material definition that can have two different shear moduli in the user-specified material directions. In the user-specified directions the stress-strain relations are as follows:
A local orientation is used to define the angle between the global directions and the user-specified material directions. In the cross-section directions the stress-strain relations are as follows:
where represents the beam's axial stress and and represent two shear stresses.*ELASTIC, TYPE=TRACTION
Property module: material editor: Mechanical Elasticity Elastic : Type : Traction
The stability criterion requires that , , and .
Defining elasticity in terms of tractions and separations for cohesive elementsFor cohesive elements used to model bonded interfaces (see Defining the constitutive response of cohesive elements using a traction-separation description, Section 26.5.6) ABAQUS offers an elasticity definition that can be written directly in terms of the nominal tractions and the nominal strains. Both uncoupled and coupled behaviors are supported. For uncoupled behavior each traction component depends only on its conjugate nominal strain, while for coupled behavior the response is more general (as shown below). In the local element directions the stress-strain relations for uncoupled behavior are as follows:
The quantities , , and represent the nominal tractions in the normal and the two local shear directions, respectively; while the quantities , , and represent the corresponding nominal strains. For coupled traction separation behavior the stress-strain relations are as follows:
*ELASTIC, TYPE=TRACTION
Use the following option to define coupled elastic behavior for cohesive elements:
*ELASTIC, TYPE=COUPLED TRACTION
Property module: material editor: Mechanical Elasticity Elastic : Type : Traction
Use the following option to define coupled elastic behavior for cohesive elements:
Property module: material editor: Mechanical Elasticity Elastic : Type : Coupled Traction
The stability criterion for uncoupled behavior requires that , , and . For coupled behavior the stability criterion requires that:
Linear elasticity can be used with any stress/displacement element or coupled temperature-displacement element in ABAQUS. The exceptions are traction elasticity, which can be used only with warping elements and cohesive elements; coupled traction elasticity, which can be used only with cohesive elements; and, in ABAQUS/Explicit, anisotropic elasticity, which is not supported for truss, rebar, and beam elements.
If the material is (almost) incompressible (Poisson's ratio for isotropic elasticity), hybrid elements should be used in ABAQUS/Standard. Compressible anisotropic elasticity should not be used with second-order hybrid continuum elements: inaccurate results and/or convergence problems may occur.