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3.1-git
DUNE for Multi-{Phase, Component, Scale, Physics, ...} flow and transport in porous media
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3.1-git
DUNE for Multi-{Phase, Component, Scale, Physics, ...} flow and transport in porous media
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This is a fluid state which allows to set the fluid pressures and takes all other quantities from an other fluid state. More...
#include <dumux/material/fluidstates/pressureoverlay.hh>
This is a fluid state which allows to set the fluid pressures and takes all other quantities from an other fluid state.
Public Types | |
| using | Scalar = typename FluidState::Scalar |
| export the scalar type More... | |
Public Member Functions | |
| PressureOverlayFluidState (const FluidState &fs) | |
| Constructor. More... | |
| PressureOverlayFluidState (const PressureOverlayFluidState &fs)=default | |
| PressureOverlayFluidState (PressureOverlayFluidState &&fs)=default | |
| PressureOverlayFluidState & | operator= (const PressureOverlayFluidState &fs)=default |
| PressureOverlayFluidState & | operator= (PressureOverlayFluidState &&fs)=default |
| Scalar | saturation (int phaseIdx) const |
| Returns the saturation \(S_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[-]}\). More... | |
| Scalar | moleFraction (int phaseIdx, int compIdx) const |
| Returns the molar fraction \(x^\kappa_\alpha\) of the component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[-]}\). More... | |
| Scalar | massFraction (int phaseIdx, int compIdx) const |
| Returns the mass fraction \(X^\kappa_\alpha\) of component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[-]}\). More... | |
| Scalar | averageMolarMass (int phaseIdx) const |
| The average molar mass \(\overline M_\alpha\) of phase \(\alpha\) in \(\mathrm{[kg/mol]}\). More... | |
| Scalar | molarity (int phaseIdx, int compIdx) const |
| The molar concentration \(c^\kappa_\alpha\) of component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[mol/m^3]}\). More... | |
| Scalar | fugacity (int phaseIdx, int compIdx) const |
| The fugacity \(f^\kappa_\alpha\) of component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[Pa]}\). More... | |
| Scalar | fugacityCoefficient (int phaseIdx, int compIdx) const |
| The fugacity coefficient \(\Phi^\kappa_\alpha\) of component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[-]}\). More... | |
| Scalar | molarVolume (int phaseIdx) const |
| The molar volume \(v_{mol,\alpha}\) of a fluid phase \(\alpha\) in \(\mathrm{[m^3/mol]}\). More... | |
| Scalar | density (int phaseIdx) const |
| The mass density \(\rho_\alpha\) of the fluid phase \(\alpha\) in \(\mathrm{[kg/m^3]}\). More... | |
| Scalar | molarDensity (int phaseIdx) const |
| The molar density \(\rho_{mol,\alpha}\) of a fluid phase \(\alpha\) in \(\mathrm{[mol/m^3]}\). More... | |
| Scalar | temperature (int phaseIdx) const |
| The absolute temperature \(T_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[K]}\). More... | |
| Scalar | pressure (int phaseIdx) const |
| The pressure \(p_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[Pa]}\). More... | |
| Scalar | enthalpy (int phaseIdx) const |
| The specific enthalpy \(h_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[J/kg]}\). More... | |
| Scalar | internalEnergy (int phaseIdx) const |
| The specific internal energy \(u_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[J/kg]}\). More... | |
| Scalar | viscosity (int phaseIdx) const |
| The dynamic viscosity \(\mu_\alpha\) of fluid phase \(\alpha\) in \(\mathrm{[Pa s]}\). More... | |
| void | setPressure (int phaseIdx, Scalar value) |
| Set the pressure \(\mathrm{[Pa]}\) of a fluid phase. More... | |
Static Public Attributes | |
| static constexpr int | numPhases = FluidState::numPhases |
| static constexpr int | numComponents = FluidState::numComponents |
Protected Attributes | |
| const FluidState * | fs_ |
| Scalar | pressure_ [numPhases] = {} |
| using Dumux::PressureOverlayFluidState< FluidState >::Scalar = typename FluidState::Scalar |
export the scalar type
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Constructor.
| fs | Fluidstate The overlay fluid state copies the pressures from the argument, so it initially behaves exactly like the underlying fluid state. |
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The average molar mass \(\overline M_\alpha\) of phase \(\alpha\) in \(\mathrm{[kg/mol]}\).
The average molar mass is the mean mass of a mole of the fluid at current composition. It is defined as the sum of the component's molar masses weighted by the current mole fraction:
\[\mathrm{ \overline M_\alpha = \sum_\kappa M^\kappa x_\alpha^\kappa}\]
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The mass density \(\rho_\alpha\) of the fluid phase \(\alpha\) in \(\mathrm{[kg/m^3]}\).
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The specific enthalpy \(h_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[J/kg]}\).
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The fugacity \(f^\kappa_\alpha\) of component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[Pa]}\).
The fugacity is defined as: \(f_\alpha^\kappa := \Phi^\kappa_\alpha x^\kappa_\alpha p_\alpha \;,\) where \(\Phi^\kappa_\alpha\) is the fugacity coefficient [59] . The physical meaning of fugacity becomes clear from the equation:
\[f_\alpha^\kappa = p_\alpha \exp\left\{\frac{\zeta^\kappa_\alpha}{R T_\alpha} \right\} \;,\]
where \(\zeta^\kappa_\alpha\) represents the \(\kappa\)'s chemical potential in phase \(\alpha\), \(R\) stands for the ideal gas constant, and \(T_\alpha\) for the absolute temperature of phase \(\alpha\). Assuming thermal equilibrium, there is a one-to-one mapping between a component's chemical potential \(\zeta^\kappa_\alpha\) and its fugacity \(f^\kappa_\alpha\). In this case chemical equilibrium can thus be expressed by:
\[f^\kappa := f^\kappa_\alpha = f^\kappa_\beta\quad\forall \alpha, \beta\]
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The fugacity coefficient \(\Phi^\kappa_\alpha\) of component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[-]}\).
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The specific internal energy \(u_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[J/kg]}\).
The specific internal energy is defined by the relation:
\[u_\alpha = h_\alpha - \frac{p_\alpha}{\rho_\alpha}\]
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Returns the mass fraction \(X^\kappa_\alpha\) of component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[-]}\).
The mass fraction \(X^\kappa_\alpha\) is defined as the weight of all molecules of a component divided by the total mass of the fluid phase. It is related with the component's mole fraction by means of the relation
\[X^\kappa_\alpha = x^\kappa_\alpha \frac{M^\kappa}{\overline M_\alpha}\;,\]
where \(M^\kappa\) is the molar mass of component \(\kappa\) and \(\overline M_\alpha\) is the mean molar mass of a molecule of phase \(\alpha\).
| phaseIdx | the index of the phase |
| compIdx | the index of the component |
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The molar density \(\rho_{mol,\alpha}\) of a fluid phase \(\alpha\) in \(\mathrm{[mol/m^3]}\).
The molar density is defined by the mass density \(\rho_\alpha\) and the mean molar mass \(\overline M_\alpha\):
\[\rho_{mol,\alpha} = \frac{\rho_\alpha}{\overline M_\alpha} \;.\]
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The molar concentration \(c^\kappa_\alpha\) of component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[mol/m^3]}\).
This quantity is usually called "molar concentration" or just "concentration", but there are many other (though less common) measures for concentration.
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The molar volume \(v_{mol,\alpha}\) of a fluid phase \(\alpha\) in \(\mathrm{[m^3/mol]}\).
This quantity is the inverse of the molar density.
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Returns the molar fraction \(x^\kappa_\alpha\) of the component \(\kappa\) in fluid phase \(\alpha\) in \(\mathrm{[-]}\).
The molar fraction \(x^\kappa_\alpha\) is defined as the ratio of the number of molecules of component \(\kappa\) and the total number of molecules of the phase \(\alpha\).
| phaseIdx | the index of the phase |
| compIdx | the index of the component |
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The pressure \(p_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[Pa]}\).
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Returns the saturation \(S_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[-]}\).
The saturation is defined as the pore space occupied by the fluid divided by the total pore space:
\[S_\alpha := \frac{\phi \mathcal{V}_\alpha}{\phi \mathcal{V}}\]
| phaseIdx | the index of the phase |
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Set the pressure \(\mathrm{[Pa]}\) of a fluid phase.
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The absolute temperature \(T_\alpha\) of a fluid phase \(\alpha\) in \(\mathrm{[K]}\).
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The dynamic viscosity \(\mu_\alpha\) of fluid phase \(\alpha\) in \(\mathrm{[Pa s]}\).
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1.9.3