Cantera  3.1.0
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MargulesVPSSTP.h
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1/**
2 * @file MargulesVPSSTP.h (see @ref thermoprops and class @link
3 * Cantera::MargulesVPSSTP MargulesVPSSTP@endlink).
4 */
5
6// This file is part of Cantera. See License.txt in the top-level directory or
7// at https://cantera.org/license.txt for license and copyright information.
8
9#ifndef CT_MARGULESVPSSTP_H
10#define CT_MARGULESVPSSTP_H
11
12#include "GibbsExcessVPSSTP.h"
13
14namespace Cantera
15{
16
17//! MargulesVPSSTP is a derived class of GibbsExcessVPSSTP that employs the
18//! Margules approximation for the excess Gibbs free energy
19/*!
20 * MargulesVPSSTP derives from class GibbsExcessVPSSTP which is derived from
21 * VPStandardStateTP, and overloads the virtual methods defined there with ones
22 * that use expressions appropriate for the Margules Excess Gibbs free energy
23 * approximation.
24 *
25 * The independent unknowns are pressure, temperature, and mass fraction.
26 *
27 * ## Specification of Species Standard State Properties
28 *
29 * All species are defined to have standard states that depend upon both the
30 * temperature and the pressure. The Margules approximation assumes symmetric
31 * standard states, where all of the standard state assume that the species are
32 * in pure component states at the temperature and pressure of the solution. I
33 * don't think it prevents, however, some species from being dilute in the
34 * solution.
35 *
36 * ## Specification of Solution Thermodynamic Properties
37 *
38 * The molar excess Gibbs free energy is given by the following formula which is
39 * a sum over interactions *i*. Each of the interactions are binary interactions
40 * involving two of the species in the phase, denoted, *Ai* and *Bi*. This is
41 * the generalization of the Margules formulation for a phase that has more than
42 * 2 species.
43 *
44 * @f[
45 * G^E = \sum_i \left( H_{Ei} - T S_{Ei} \right)
46 * @f]
47 * @f[
48 * H^E_i = n X_{Ai} X_{Bi} \left( h_{o,i} + h_{1,i} X_{Bi} \right)
49 * @f]
50 * @f[
51 * S^E_i = n X_{Ai} X_{Bi} \left( s_{o,i} + s_{1,i} X_{Bi} \right)
52 * @f]
53 *
54 * where n is the total moles in the solution.
55 *
56 * The activity of a species defined in the phase is given by an excess Gibbs
57 * free energy formulation.
58 *
59 * @f[
60 * a_k = \gamma_k X_k
61 * @f]
62 *
63 * where
64 *
65 * @f[
66 * R T \ln( \gamma_k )= \frac{d(n G^E)}{d(n_k)}\Bigg|_{n_i}
67 * @f]
68 *
69 * Taking the derivatives results in the following expression
70 *
71 * @f[
72 * R T \ln( \gamma_k )= \sum_i \left( \left( \delta_{Ai,k} X_{Bi} + \delta_{Bi,k} X_{Ai} - X_{Ai} X_{Bi} \right)
73 * \left( g^E_{o,i} + g^E_{1,i} X_{Bi} \right) +
74 * \left( \delta_{Bi,k} - X_{Bi} \right) X_{Ai} X_{Bi} g^E_{1,i} \right)
75 * @f]
76 * where
77 * @f$ g^E_{o,i} = h_{o,i} - T s_{o,i} @f$ and
78 * @f$ g^E_{1,i} = h_{1,i} - T s_{1,i} @f$ and where
79 * @f$ X_k @f$ is the mole fraction of species *k*.
80 *
81 * This object inherits from the class VPStandardStateTP. Therefore, the
82 * specification and calculation of all standard state and reference state
83 * values are handled at that level. Various functional forms for the standard
84 * state are permissible. The chemical potential for species *k* is equal to
85 *
86 * @f[
87 * \mu_k(T,P) = \mu^o_k(T, P) + R T \ln(\gamma_k X_k)
88 * @f]
89 *
90 * The partial molar entropy for species *k* is given by
91 *
92 * @f[
93 * \tilde{s}_k(T,P) = s^o_k(T,P) - R \ln( \gamma_k X_k )
94 * - R T \frac{d \ln(\gamma_k) }{dT}
95 * @f]
96 *
97 * The partial molar enthalpy for species *k* is given by
98 *
99 * @f[
100 * \tilde{h}_k(T,P) = h^o_k(T,P) - R T^2 \frac{d \ln(\gamma_k)}{dT}
101 * @f]
102 *
103 * The partial molar volume for species *k* is
104 *
105 * @f[
106 * \tilde V_k(T,P) = V^o_k(T,P) + R T \frac{d \ln(\gamma_k) }{dP}
107 * @f]
108 *
109 * The partial molar Heat Capacity for species *k* is
110 *
111 * @f[
112 * \tilde{C}_{p,k}(T,P) = C^o_{p,k}(T,P) - 2 R T \frac{d \ln( \gamma_k )}{dT}
113 * - R T^2 \frac{d^2 \ln(\gamma_k) }{{dT}^2}
114 * @f]
115 *
116 * ## Application within Kinetics Managers
117 *
118 * @f$ C^a_k @f$ are defined such that @f$ a_k = C^a_k / C^s_k, @f$ where
119 * @f$ C^s_k @f$ is a standard concentration defined below and @f$ a_k @f$ are
120 * activities used in the thermodynamic functions. These activity (or
121 * generalized) concentrations are used by kinetics manager classes to compute
122 * the forward and reverse rates of elementary reactions. The activity
123 * concentration,@f$ C^a_k @f$,is given by the following expression.
124 *
125 * @f[
126 * C^a_k = C^s_k X_k = \frac{P}{R T} X_k
127 * @f]
128 *
129 * The standard concentration for species *k* is independent of *k* and equal to
130 *
131 * @f[
132 * C^s_k = C^s = \frac{P}{R T}
133 * @f]
134 *
135 * For example, a bulk-phase binary gas reaction between species j and k,
136 * producing a new gas species l would have the following equation for its rate
137 * of progress variable, @f$ R^1 @f$, which has units of kmol m-3 s-1.
138 *
139 * @f[
140 * R^1 = k^1 C_j^a C_k^a = k^1 (C^s a_j) (C^s a_k)
141 * @f]
142 * where
143 * @f[
144 * C_j^a = C^s a_j \mbox{\quad and \quad} C_k^a = C^s a_k
145 * @f]
146 *
147 * @f$ C_j^a @f$ is the activity concentration of species j, and @f$ C_k^a @f$
148 * is the activity concentration of species k. @f$ C^s @f$ is the standard
149 * concentration. @f$ a_j @f$ is the activity of species j which is equal to the
150 * mole fraction of j.
151 *
152 * The reverse rate constant can then be obtained from the law of microscopic
153 * reversibility and the equilibrium expression for the system.
154 *
155 * @f[
156 * \frac{a_j a_k}{ a_l} = K_a^{o,1} = \exp(\frac{\mu^o_l - \mu^o_j - \mu^o_k}{R T} )
157 * @f]
158 *
159 * @f$ K_a^{o,1} @f$ is the dimensionless form of the equilibrium constant,
160 * associated with the pressure dependent standard states @f$ \mu^o_l(T,P) @f$
161 * and their associated activities, @f$ a_l @f$, repeated here:
162 *
163 * @f[
164 * \mu_l(T,P) = \mu^o_l(T, P) + R T \ln a_l
165 * @f]
166 *
167 * We can switch over to expressing the equilibrium constant in terms of the
168 * reference state chemical potentials
169 *
170 * @f[
171 * K_a^{o,1} = \exp(\frac{\mu^{ref}_l - \mu^{ref}_j - \mu^{ref}_k}{R T} ) * \frac{P_{ref}}{P}
172 * @f]
173 *
174 * The concentration equilibrium constant, @f$ K_c @f$, may be obtained by
175 * changing over to activity concentrations. When this is done:
176 *
177 * @f[
178 * \frac{C^a_j C^a_k}{ C^a_l} = C^o K_a^{o,1} = K_c^1 =
179 * \exp(\frac{\mu^{ref}_l - \mu^{ref}_j - \mu^{ref}_k}{R T} ) * \frac{P_{ref}}{RT}
180 * @f]
181 *
182 * %Kinetics managers will calculate the concentration equilibrium constant, @f$
183 * K_c @f$, using the second and third part of the above expression as a
184 * definition for the concentration equilibrium constant.
185 *
186 * For completeness, the pressure equilibrium constant may be obtained as well
187 *
188 * @f[
189 * \frac{P_j P_k}{ P_l P_{ref}} = K_p^1 = \exp(\frac{\mu^{ref}_l - \mu^{ref}_j - \mu^{ref}_k}{R T} )
190 * @f]
191 *
192 * @f$ K_p @f$ is the simplest form of the equilibrium constant for ideal gases.
193 * However, it isn't necessarily the simplest form of the equilibrium constant
194 * for other types of phases; @f$ K_c @f$ is used instead because it is
195 * completely general.
196 *
197 * The reverse rate of progress may be written down as
198 * @f[
199 * R^{-1} = k^{-1} C_l^a = k^{-1} (C^o a_l)
200 * @f]
201 *
202 * where we can use the concept of microscopic reversibility to write the
203 * reverse rate constant in terms of the forward rate constant and the
204 * concentration equilibrium constant, @f$ K_c @f$.
205 *
206 * @f[
207 * k^{-1} = k^1 K^1_c
208 * @f]
209 *
210 * @f$ k^{-1} @f$ has units of s-1.
211 *
212 * @ingroup thermoprops
213 */
215{
216public:
217 //! Construct a MargulesVPSSTP object from an input file
218 /*!
219 * @param inputFile Name of the input file containing the phase definition.
220 * If blank, an empty phase will be created.
221 * @param id name (ID) of the phase in the input file. If empty, the
222 * first phase definition in the input file will be used.
223 */
224 explicit MargulesVPSSTP(const string& inputFile="", const string& id="");
225
226 string type() const override {
227 return "Margules";
228 }
229
230 //! @name Molar Thermodynamic Properties
231 //! @{
232
233 double enthalpy_mole() const override;
234 double entropy_mole() const override;
235 double cp_mole() const override;
236 double cv_mole() const override;
237
238 //! @}
239 //! @name Activities, Standard States, and Activity Concentrations
240 //!
241 //! The activity @f$ a_k @f$ of a species in solution is related to the
242 //! chemical potential by @f[ \mu_k = \mu_k^0(T) + \hat R T \ln a_k. @f] The
243 //! quantity @f$ \mu_k^0(T,P) @f$ is the chemical potential at unit activity,
244 //! which depends only on temperature and pressure.
245 //! @{
246
247 void getLnActivityCoefficients(double* lnac) const override;
248
249 //! @}
250 //! @name Partial Molar Properties of the Solution
251 //! @{
252
253 void getChemPotentials(double* mu) const override;
254
255 //! Returns an array of partial molar enthalpies for the species in the
256 //! mixture.
257 /*!
258 * Units (J/kmol)
259 *
260 * For this phase, the partial molar enthalpies are equal to the standard
261 * state enthalpies modified by the derivative of the molality-based
262 * activity coefficient wrt temperature
263 *
264 * @f[
265 * \bar h_k(T,P) = h^o_k(T,P) - R T^2 \frac{d \ln(\gamma_k)}{dT}
266 * @f]
267 *
268 * @param hbar Vector of returned partial molar enthalpies
269 * (length m_kk, units = J/kmol)
270 */
271 void getPartialMolarEnthalpies(double* hbar) const override;
272
273 //! Returns an array of partial molar entropies for the species in the
274 //! mixture.
275 /*!
276 * Units (J/kmol)
277 *
278 * For this phase, the partial molar enthalpies are equal to the standard
279 * state enthalpies modified by the derivative of the activity coefficient
280 * wrt temperature
281 *
282 * @f[
283 * \bar s_k(T,P) = s^o_k(T,P) - R T^2 \frac{d \ln(\gamma_k)}{dT}
284 * - R \ln( \gamma_k X_k)
285 * - R T \frac{d \ln(\gamma_k) }{dT}
286 * @f]
287 *
288 * @param sbar Vector of returned partial molar entropies
289 * (length m_kk, units = J/kmol/K)
290 */
291 void getPartialMolarEntropies(double* sbar) const override;
292
293 //! Returns an array of partial molar entropies for the species in the
294 //! mixture.
295 /*!
296 * Units (J/kmol)
297 *
298 * For this phase, the partial molar enthalpies are equal to the standard
299 * state enthalpies modified by the derivative of the activity coefficient
300 * wrt temperature
301 *
302 * @f[
303 * ???????????????
304 * \bar s_k(T,P) = s^o_k(T,P) - R T^2 \frac{d \ln(\gamma_k)}{dT}
305 * - R \ln( \gamma_k X_k)
306 * - R T \frac{d \ln(\gamma_k) }{dT}
307 * ???????????????
308 * @f]
309 *
310 * @param cpbar Vector of returned partial molar heat capacities
311 * (length m_kk, units = J/kmol/K)
312 */
313 void getPartialMolarCp(double* cpbar) const override;
314
315 void getPartialMolarVolumes(double* vbar) const override;
316
317 //! Get the array of temperature second derivatives of the log activity
318 //! coefficients
319 /*!
320 * units = 1/Kelvin
321 *
322 * @param d2lnActCoeffdT2 Output vector of temperature 2nd derivatives of
323 * the log Activity Coefficients. length = m_kk
324 */
325 void getd2lnActCoeffdT2(double* d2lnActCoeffdT2) const;
326
327 void getdlnActCoeffdT(double* dlnActCoeffdT) const override;
328
329 //! @}
330 //! @name Initialization
331 //!
332 //! The following methods are used in the process of constructing the phase
333 //! and setting its parameters from a specification in an input file. They
334 //! are not normally used in application programs. To see how they are used,
335 //! see importPhase()
336 //! @{
337
338 void initThermo() override;
339 void getParameters(AnyMap& phaseNode) const override;
340
341 //! Add a binary species interaction with the specified parameters
342 /*!
343 * @param speciesA name of the first species
344 * @param speciesB name of the second species
345 * @param h0 first excess enthalpy coefficient [J/kmol]
346 * @param h1 second excess enthalpy coefficient [J/kmol]
347 * @param s0 first excess entropy coefficient [J/kmol/K]
348 * @param s1 second excess entropy coefficient [J/kmol/K]
349 * @param vh0 first enthalpy coefficient for excess volume [m^3/kmol]
350 * @param vh1 second enthalpy coefficient for excess volume [m^3/kmol]
351 * @param vs0 first entropy coefficient for excess volume [m^3/kmol/K]
352 * @param vs1 second entropy coefficient for excess volume [m^3/kmol/K]
353 */
354 void addBinaryInteraction(const string& speciesA,
355 const string& speciesB, double h0, double h1, double s0, double s1,
356 double vh0, double vh1, double vs0, double vs1);
357
358 //! @}
359 //! @name Derivatives of Thermodynamic Variables needed for Applications
360 //! @{
361
362 void getdlnActCoeffds(const double dTds, const double* const dXds,
363 double* dlnActCoeffds) const override;
364 void getdlnActCoeffdlnX_diag(double* dlnActCoeffdlnX_diag) const override;
365 void getdlnActCoeffdlnN_diag(double* dlnActCoeffdlnN_diag) const override;
366 void getdlnActCoeffdlnN(const size_t ld, double* const dlnActCoeffdlnN) override;
367
368 //! @}
369
370private:
371 //! Initialize lengths of local variables after all species have been
372 //! identified.
373 void initLengths();
374
375 //! Update the activity coefficients
376 /*!
377 * This function will be called to update the internally stored natural
378 * logarithm of the activity coefficients
379 */
380 void s_update_lnActCoeff() const;
381
382 //! Update the derivative of the log of the activity coefficients wrt T
383 /*!
384 * This function will be called to update the internally stored derivative
385 * of the natural logarithm of the activity coefficients wrt temperature.
386 */
387 void s_update_dlnActCoeff_dT() const;
388
389 //! Update the derivative of the log of the activity coefficients wrt
390 //! log(mole fraction)
391 /*!
392 * This function will be called to update the internally stored derivative
393 * of the natural logarithm of the activity coefficients wrt logarithm of
394 * the mole fractions.
395 */
397
398 //! Update the derivative of the log of the activity coefficients wrt
399 //! log(moles) - diagonal only
400 /*!
401 * This function will be called to update the internally stored diagonal
402 * entries for the derivative of the natural logarithm of the activity
403 * coefficients wrt logarithm of the moles.
404 */
406
407 //! Update the derivative of the log of the activity coefficients wrt
408 //! log(moles_m)
409 /*!
410 * This function will be called to update the internally stored derivative
411 * of the natural logarithm of the activity coefficients wrt logarithm of
412 * the mole number of species
413 */
414 void s_update_dlnActCoeff_dlnN() const;
415
416protected:
417 //! number of binary interaction expressions
419
420 //! Enthalpy term for the binary mole fraction interaction of the
421 //! excess Gibbs free energy expression
422 mutable vector<double> m_HE_b_ij;
423
424 //! Enthalpy term for the ternary mole fraction interaction of the
425 //! excess Gibbs free energy expression
426 mutable vector<double> m_HE_c_ij;
427
428 //! Entropy term for the binary mole fraction interaction of the
429 //! excess Gibbs free energy expression
430 mutable vector<double> m_SE_b_ij;
431
432 //! Entropy term for the ternary mole fraction interaction of the
433 //! excess Gibbs free energy expression
434 mutable vector<double> m_SE_c_ij;
435
436 //! Enthalpy term for the binary mole fraction interaction of the
437 //! excess Gibbs free energy expression
438 mutable vector<double> m_VHE_b_ij;
439
440 //! Enthalpy term for the ternary mole fraction interaction of the
441 //! excess Gibbs free energy expression
442 mutable vector<double> m_VHE_c_ij;
443
444 //! Entropy term for the binary mole fraction interaction of the
445 //! excess Gibbs free energy expression
446 mutable vector<double> m_VSE_b_ij;
447
448 //! Entropy term for the ternary mole fraction interaction of the
449 //! excess Gibbs free energy expression
450 mutable vector<double> m_VSE_c_ij;
451
452 //! vector of species indices representing species A in the interaction
453 /*!
454 * Each Margules excess Gibbs free energy term involves two species, A and
455 * B. This vector identifies species A.
456 */
457 vector<size_t> m_pSpecies_A_ij;
458
459 //! vector of species indices representing species B in the interaction
460 /*!
461 * Each Margules excess Gibbs free energy term involves two species, A and
462 * B. This vector identifies species B.
463 */
464 vector<size_t> m_pSpecies_B_ij;
465
466 //! form of the Margules interaction expression
467 /*!
468 * Currently there is only one form.
469 */
471
472 //! form of the temperature dependence of the Margules interaction expression
473 /*!
474 * Currently there is only one form -> constant wrt temperature.
475 */
477};
478
479}
480
481#endif
Header for intermediate ThermoPhase object for phases which employ Gibbs excess free energy based for...
A map of string keys to values whose type can vary at runtime.
Definition AnyMap.h:431
GibbsExcessVPSSTP is a derived class of ThermoPhase that handles variable pressure standard state met...
MargulesVPSSTP is a derived class of GibbsExcessVPSSTP that employs the Margules approximation for th...
void getdlnActCoeffds(const double dTds, const double *const dXds, double *dlnActCoeffds) const override
Get the change in activity coefficients wrt changes in state (temp, mole fraction,...
double enthalpy_mole() const override
Molar enthalpy. Units: J/kmol.
void getPartialMolarEnthalpies(double *hbar) const override
Returns an array of partial molar enthalpies for the species in the mixture.
void getChemPotentials(double *mu) const override
Get the species chemical potentials. Units: J/kmol.
vector< double > m_VHE_c_ij
Enthalpy term for the ternary mole fraction interaction of the excess Gibbs free energy expression.
vector< double > m_SE_b_ij
Entropy term for the binary mole fraction interaction of the excess Gibbs free energy expression.
int formTempModel_
form of the temperature dependence of the Margules interaction expression
size_t numBinaryInteractions_
number of binary interaction expressions
vector< double > m_SE_c_ij
Entropy term for the ternary mole fraction interaction of the excess Gibbs free energy expression.
void s_update_dlnActCoeff_dlnN_diag() const
Update the derivative of the log of the activity coefficients wrt log(moles) - diagonal only.
void getParameters(AnyMap &phaseNode) const override
Store the parameters of a ThermoPhase object such that an identical one could be reconstructed using ...
string type() const override
String indicating the thermodynamic model implemented.
void initThermo() override
Initialize the ThermoPhase object after all species have been set up.
void getPartialMolarVolumes(double *vbar) const override
Return an array of partial molar volumes for the species in the mixture.
vector< size_t > m_pSpecies_A_ij
vector of species indices representing species A in the interaction
double cv_mole() const override
Molar heat capacity at constant volume. Units: J/kmol/K.
void s_update_dlnActCoeff_dT() const
Update the derivative of the log of the activity coefficients wrt T.
vector< size_t > m_pSpecies_B_ij
vector of species indices representing species B in the interaction
vector< double > m_VSE_c_ij
Entropy term for the ternary mole fraction interaction of the excess Gibbs free energy expression.
void s_update_dlnActCoeff_dlnN() const
Update the derivative of the log of the activity coefficients wrt log(moles_m)
int formMargules_
form of the Margules interaction expression
double entropy_mole() const override
Molar entropy. Units: J/kmol/K.
vector< double > m_HE_b_ij
Enthalpy term for the binary mole fraction interaction of the excess Gibbs free energy expression.
void getdlnActCoeffdT(double *dlnActCoeffdT) const override
Get the array of temperature derivatives of the log activity coefficients.
vector< double > m_VSE_b_ij
Entropy term for the binary mole fraction interaction of the excess Gibbs free energy expression.
double cp_mole() const override
Molar heat capacity at constant pressure. Units: J/kmol/K.
void getPartialMolarCp(double *cpbar) const override
Returns an array of partial molar entropies for the species in the mixture.
void initLengths()
Initialize lengths of local variables after all species have been identified.
void getLnActivityCoefficients(double *lnac) const override
Get the array of non-dimensional molar-based ln activity coefficients at the current solution tempera...
void s_update_dlnActCoeff_dlnX_diag() const
Update the derivative of the log of the activity coefficients wrt log(mole fraction)
void s_update_lnActCoeff() const
Update the activity coefficients.
void getdlnActCoeffdlnX_diag(double *dlnActCoeffdlnX_diag) const override
Get the array of ln mole fraction derivatives of the log activity coefficients - diagonal component o...
vector< double > m_VHE_b_ij
Enthalpy term for the binary mole fraction interaction of the excess Gibbs free energy expression.
void addBinaryInteraction(const string &speciesA, const string &speciesB, double h0, double h1, double s0, double s1, double vh0, double vh1, double vs0, double vs1)
Add a binary species interaction with the specified parameters.
vector< double > m_HE_c_ij
Enthalpy term for the ternary mole fraction interaction of the excess Gibbs free energy expression.
void getdlnActCoeffdlnN_diag(double *dlnActCoeffdlnN_diag) const override
Get the array of log species mole number derivatives of the log activity coefficients.
void getd2lnActCoeffdT2(double *d2lnActCoeffdT2) const
Get the array of temperature second derivatives of the log activity coefficients.
void getPartialMolarEntropies(double *sbar) const override
Returns an array of partial molar entropies for the species in the mixture.
void getdlnActCoeffdlnN(const size_t ld, double *const dlnActCoeffdlnN) override
Get the array of derivatives of the log activity coefficients with respect to the log of the species ...
Namespace for the Cantera kernel.
Definition AnyMap.cpp:595