modeling of neo-hookean materials using fem by: robert carson
TRANSCRIPT
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Modeling of Neo-Hookean Materials using FEM
By: Robert Carson
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Overview
• Introduction• Background Information• Nonlinear Finite Element Implementation• Results• Conclusion
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Introduction• Neo-Hookean materials fall
under a classification of materials known as hyperelastic materials– Elastomer often fall under this
category• Hyperelastic materials have
evolving material properties– Nonlinear material properties– Often used in large
displacement applications so also can suffer from nonlinear geometries
Elastomer mold [1]
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Solid Mechanics Brief Overview
Deformation Gradient:Green Strain:
2nd Piola-Kirchoff Stress Tensor:
Stiffness Tensor for Hyperelastic Materials:
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Neo-Hookean Material PropertiesNeo-Hookean Free energy relationship:
Note: Neo-Hookean materials only depends on the shear modulus and the bulk modulus constants as material properties
The Cauchy stress tensor can be simply found by using a push forward operation to bring it back to the material frame
Material tangent stiffness matrix can be found in a similar manner as the Cauchy stress tensor
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Derivation of Weak Form
The weak form in the material frame is the same as we have derived in class for the 3D elastic case.
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Referential Weak Form
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Isoparametric Deformation Gradients
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Referential Gradient MatrixThe referential frame the gradient matrix is a full matrix. However, the shape functions do not change as displacement changes.
While, the material frame the gradient matrix remains a sparse matrix. However, the shape functions change as the displacement.
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Total Lagrangian FormTotal Lagrangian form takes all the kinematic and static variables are referred back to the initial configuration at t=0. • By linearizing the nonlinear equations and taking appropriate substeps one can
approximate the nonlinear solution
Another formulation used called the Updated Lagrangian form refers all the kinematic and static variables to the last updated configuration at t=t-1.
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Newton-Rhapson MethodThe residual vector shows us how far off the linearized version of the nonlinear model is off from the correct solution. We use the Newton-Rhapson method to approach a solution that is “acceptable.”
We define [A] as the Jacobian matrix and will use it to find an appropriate change in the displacements.
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Jacobian Matrix
A common method to compute the Jacobian matrix is by taking the time derivative of the internal forces. The Jacobian matrix for each element is computed and then combine it into a global matrix to find the change in displacements.
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Kgeom Properties
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ANSYS Compression Results
Material Properties: E=30MPa, ν=0.3, G=11.5 MPa, K=25MPa
Displacement in Y direction: -0.2m
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ANSYS Tension Comparison
Material Properties: E=30MPa, ν=0.3, G=11.5 MPa, K=25MPa
Displacement in Y direction: 0.2m
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ANSYS Shear Comparison
Material Properties: E=30MPa, ν=0.3, G=11.5 MPa, K=25MPa
Displacement in X direction: 0.5m
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Material Response Comparison
Simple Shear Response of Neo-Hookean and Linear Material Axial Loading Response of Neo-Hookean and Linear Material
Material Properties: E=30MPa, ν=0.3, G=11.5 MPa, K=25MPa
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Error Comparison
Error of Simple Shear Response of Neo-Hookean and Linear Material
Error of Axial Loading Response of Neo-Hookean and Linear Material
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Conclusion
• Hyperelastic materials are important to model using nonlinear methods– Even at small strains error can be noticeable
• Nonlinear materials can exhibit non symmetric stress responses when loaded in the opposite direction.– Their response can be hard to predict without
modeling especially under complex loading conditions
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Thank You
• Any Questions?
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References
• [1] http://www.polytek.com/