Difference between revisions of "Isotropic, Elastic-Plastic Mie-Grüneisen Material"
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== Constitutive Law == | == Constitutive Law == | ||
This [[Material Models|MPM material]] uses a Mie-Grüneisen equation of state in the in the elastic regime and can plastically deform according to any selected [[Hardening Laws|hardening law]]. | This [[Material Models|MPM material]] uses a Mie-Grüneisen equation of state in the in the elastic regime and can plastically deform according to any selected [[Hardening Laws|hardening law]]. A large-deformation version of this material is also available in a [[Isotropic, Hyperelastic-Plastic Mie-Grüneisen Material|HEMGEOSMaterial material]] and it is usually preferred for accurate simulations. | ||
=== Mie-Grüneisen Equation of State === | === Mie-Grüneisen Equation of State === | ||
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<math>{p\over \rho_0} = {C_0^2 | <math>{p\over \rho_0} = {C_0^2 \eta \left(1 - {1\over 2}\gamma_0 \eta\right) \over (1 - S_1\eta - S_2\eta^2 - S_3 \eta^3)^2} + \gamma_0 U</math> | ||
where <math>\eta</math> is fraction compression and given by | where <math>\eta</math> is fraction compression and given by | ||
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<math>\eta = 1 - {\rho_0\over \rho} = 1 - {V\over V_0} = 1 - J</math> | <math>\eta = 1 - {\rho_0\over \rho} = 1 - {V\over V_0} = 1 - J</math> | ||
and <math>\gamma_0</math>, <math>C_0</math>, and <math>S_i</math> are material properties and <math>U</math> is total internal energy. The <math>C_0</math> property | and <math>\gamma_0</math>, <math>C_0</math>, and <math>S_i</math> are material properties and <math>U</math> is total internal energy. The <math>C_0</math> property is the bulk wave speed under low-pressure conditions. It is related to the low pressure bulk modulus by: | ||
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<math>dT = -JT \gamma_0 {V(t+\Delta t)-V(t)\over V} + {dq \over C_V}</math> | <math>dT = -JT \gamma_0 {V(t+\Delta t)-V(t)\over V} + {dq \over C_V}</math> | ||
where ''dq'' is dissipated energy, such as plastic energy, that is converted to heat. By including temperature rises and internal energy, this material automatically thermally expands with the appropriate thermal expansion coefficient without needing to enter a thermal expansion coefficient. The linear thermal expansion coefficient | where ''dq'' is dissipated energy, such as plastic energy, that is converted to heat. By including temperature rises and internal energy, this material automatically thermally expands with the appropriate thermal expansion coefficient without needing to enter a thermal expansion coefficient. The linear thermal expansion coefficient that results is | ||
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<math>\alpha = {\rho_0\gamma_0 C_v\over 3K_0}</math> | <math>\alpha = {\rho_0\gamma_0 C_v\over 3K_0} = {\gamma_0 C_v\over 3C_0^2}</math> | ||
For more details on the Mie-Grüneisen equation of state, you can refer to Wilkens (1999)<ref>M. L. Wilkens, Computer Simulation of Dynamic Phenomena, Springer-Verlag, | Note that thermal expansion depends on ''C<sub>v</sub>'', which means you must always enter a valid heat capacity for this material, otherwise the thermal expansion will be wrong. | ||
For more details on the Mie-Grüneisen equation of state, you can refer to Wilkens (1999)<ref>M. L. Wilkens, Computer Simulation of Dynamic Phenomena, Springer-Verlag, New York (1999).</ref>. The pressure equation here is different than Wilkens, but is equivalent if compared as polynomial expansions; this form is more general because it includes ''S<sub>2</sub>'' and ''S<sub>3</sub>'' parameters while Wilkens only has ''S'' = ''S<sub>1</sub>''). The Wilkens reference also has a table of experimentally determined Mie-Grüneisen properties for numerous materials (although these properties have only ''S<sub>1</sub>'' = ''S'' for the denominator). | |||
The shear stress is related to deviatoric strain by the material's shear modulus. The shear modulus is a constant (unless it is changed by a [[Hardening Laws|hardening law]]). | The shear stress is related to deviatoric strain by the material's shear modulus. The shear modulus is a constant (unless it is changed by a [[Hardening Laws|hardening law]]). | ||
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! Property !! Description !! Units !! Default | ! Property !! Description !! Units !! Default | ||
|- | |- | ||
| C0 || The bulk wave speed || | | C0 || The bulk wave speed || [[ConsistentUnits Command#Legacy and Consistent Units|alt velocity units]] || 4004 | ||
|- | |- | ||
| gamma0 || The γ<sub>0</sub> parameter || none || 1.64 | | gamma0 || The γ<sub>0</sub> parameter || none || 1.64 | ||
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|- | |- | ||
| S2 || The S<sub>2</sub> parameter || none || 0 | | S2 || The S<sub>2</sub> parameter || none || 0 | ||
|- | |||
| S3 || The S<sub>3</sub> parameter || none || 0 | |||
|- | |- | ||
| Hardening || This command selects the [[Hardening Laws|hardening law]] by its name or number. It should be before entering any yielding properties. || none || none | | Hardening || This command selects the [[Hardening Laws|hardening law]] by its name or number. It should be before entering any yielding properties. || none || none | ||
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== Examples == | == Examples == | ||
Material "copper","Copper","MGEOSMaterial" | |||
C0 3933 | |||
S1 1.5 | |||
gamma0 1.99 | |||
rho 8.96 | |||
G 48000 | |||
Cv 385 | |||
kCond 401 | |||
hardening "JohnsonCook" | |||
Ajc 90 | |||
Bjc 292 | |||
njc .31 | |||
Cjc 0.025 | |||
ep0jc 1 | |||
Tmjc 1356 | |||
mjc 1.09 | |||
Done | |||
Material "pmma","PMMA","MGEOSMaterial" | Material "pmma","PMMA","MGEOSMaterial" |
Latest revision as of 14:54, 2 June 2015
Constitutive Law
This MPM material uses a Mie-Grüneisen equation of state in the in the elastic regime and can plastically deform according to any selected hardening law. A large-deformation version of this material is also available in a HEMGEOSMaterial material and it is usually preferred for accurate simulations.
Mie-Grüneisen Equation of State
The Mie-Grüneisen equation of state defines the pressure only and the Kirchoff pressure is
[math]\displaystyle{ {p\over \rho_0} = {C_0^2 \eta \left(1 - {1\over 2}\gamma_0 \eta\right) \over (1 - S_1\eta - S_2\eta^2 - S_3 \eta^3)^2} + \gamma_0 U }[/math]
where [math]\displaystyle{ \eta }[/math] is fraction compression and given by
[math]\displaystyle{ \eta = 1 - {\rho_0\over \rho} = 1 - {V\over V_0} = 1 - J }[/math]
and [math]\displaystyle{ \gamma_0 }[/math], [math]\displaystyle{ C_0 }[/math], and [math]\displaystyle{ S_i }[/math] are material properties and [math]\displaystyle{ U }[/math] is total internal energy. The [math]\displaystyle{ C_0 }[/math] property is the bulk wave speed under low-pressure conditions. It is related to the low pressure bulk modulus by:
[math]\displaystyle{ K_0 = \rho_0 C_0^2 }[/math]
The above pressure equation is used only in compression ([math]\displaystyle{ \eta\gt 0 }[/math]). In tension, the pressure is given by
[math]\displaystyle{ P = C_0^2\eta + \gamma_0 U }[/math]
This equation of state also causes a temperature change of
[math]\displaystyle{ dT = -JT \gamma_0 {V(t+\Delta t)-V(t)\over V} + {dq \over C_V} }[/math]
where dq is dissipated energy, such as plastic energy, that is converted to heat. By including temperature rises and internal energy, this material automatically thermally expands with the appropriate thermal expansion coefficient without needing to enter a thermal expansion coefficient. The linear thermal expansion coefficient that results is
[math]\displaystyle{ \alpha = {\rho_0\gamma_0 C_v\over 3K_0} = {\gamma_0 C_v\over 3C_0^2} }[/math]
Note that thermal expansion depends on Cv, which means you must always enter a valid heat capacity for this material, otherwise the thermal expansion will be wrong.
For more details on the Mie-Grüneisen equation of state, you can refer to Wilkens (1999)[1]. The pressure equation here is different than Wilkens, but is equivalent if compared as polynomial expansions; this form is more general because it includes S2 and S3 parameters while Wilkens only has S = S1). The Wilkens reference also has a table of experimentally determined Mie-Grüneisen properties for numerous materials (although these properties have only S1 = S for the denominator).
The shear stress is related to deviatoric strain by the material's shear modulus. The shear modulus is a constant (unless it is changed by a hardening law).
Material Properties
The Mie-Grüneisen equation of state properties and the hardening law properties are set with the following options:
Property | Description | Units | Default |
---|---|---|---|
C0 | The bulk wave speed | alt velocity units | 4004 |
gamma0 | The γ0 parameter | none | 1.64 |
S0 | The S0 parameter | none | 1.35 |
S1 | The S1 parameter | none | 0 |
S2 | The S2 parameter | none | 0 |
S3 | The S3 parameter | none | 0 |
Hardening | This command selects the hardening law by its name or number. It should be before entering any yielding properties. | none | none |
(yield) | Enter all plasticity properties required by the selected hardening law. | varies | varies |
(other) | All other properties are identical to the properties for an isotropic material, except that only shear modulus, G, is used and thermal expansion coefficient, alpha, is ignored. | varies | varies |
History Variables
The material has none, but the hardening law will have at least one.
In particle properties, the "strain" will be the elastic strain and the "plastic strain" will have the plastic strain. The total strain is the sum of elastic and plastic strains.
Examples
Material "copper","Copper","MGEOSMaterial" C0 3933 S1 1.5 gamma0 1.99 rho 8.96 G 48000 Cv 385 kCond 401 hardening "JohnsonCook" Ajc 90 Bjc 292 njc .31 Cjc 0.025 ep0jc 1 Tmjc 1356 mjc 1.09 Done Material "pmma","PMMA","MGEOSMaterial" C0 2300 S1 1.82 gamma0 1.82 rho 1.18 G 1075 Cv 1466 kCond 0.2 hardening "Linear" yield 40 Ep 1500 Done
References
- ↑ M. L. Wilkens, Computer Simulation of Dynamic Phenomena, Springer-Verlag, New York (1999).