Post on 15-Jul-2020
Computational Plasticity 1
Introduction to Finite Strains
Topics: • Finite strain kinematics
• Stress measures
• Hyperelasticity
Computational Plasticity 2
Finite Strain Kinematics
Computational Plasticity 3
The deformation map
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Rigid deformation
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Motion. Time-dependent deformations
Computational Plasticity 6
Rigid motion. Rigid velocity
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The deformation gradient
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Measuring volumetric changes. The determinant of the deformation gradient
Computational Plasticity 9
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Locally isochoric (volume-preserving) deformations
Locally purely volumetric deformations
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Isochoric/volumetric split of the deformation gradient
Note that
Computational Plasticity 12
Polar decomposition. Local rotation and stretches
Right and left stretch tensors
Right and left Cauchy-Green strain tensors
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Spectral decomposition. Principal stretches
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Strain measures
Green-Lagrange strain tensor
Locally rigid deformation
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Spectral representation of the Green-Lagrange strain
Other Lagrangian strain tensors
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Eulerian strain measures
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Velocity gradient
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Rate of deformation and spin
Consider a uniform velocity gradient. We have The image cannot be displayed. Your computer may not have enough memory to open the image, or the image may have been corrupted. Restart your computer, and then open the file again. If the red x still appears, you may have to delete the image and then insert it again.
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or, equivalently, rigid
velocity
straining velocity
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Rate of volume change
Also note that
so that, equivalently,
Computational Plasticity 22
Stress Measures
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The Cauchy stress tensor
Cauchy’s Theorem establishes that
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Principal Cauchy stresses
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Deviatoric and hydrostatic Cauchy stresses
The Kirchhoff stress tensor
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The First Piola-Kirchhoff (or nominal) stress tensor
measures force per unit reference area
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Finite Strain Hyperelasticity
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Thermodynamics with internal variables. Dissipative models
Free-energy function
Dissipation inequality. Second law of thermodynamics
Dissipation
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…the dissipation inequality implies
Hyperelasticity. Definition
No dissipation !
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Material objectivity
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Isotropic hyperelasticity
the free-energy is an isotropic scalar function of a tensor argument
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Principal stretches representation
Principal stresses
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Invariant representation
Stress
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Regularised (compressible) Neo-Hookean model
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Regularised (compressible) Ogden model
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Hencky model (logarithmic strain-based)
Important properties
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Hyperelasticity boundary value problem
Linearised virtual work equation
Reference (or material) description
material tangent modulus or first elasticity tensor
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Spatial description
Linearised virtual work equation
spatial tangent modulus
Computational Plasticity 39
FE Equations (spatial description)
Newton-Raphson solution
Computational Plasticity 40
Example