User:Xenomancer/NRTL derivatives

The derivatives of the general NRTL equations are very useful for VLE calculations, but are incredibly cumbersome to perform by hand in the general form.

General NRTL equations[edit]

The general equation for $\ln(\gamma _{i})$ for species $i$ in a mixture of $n$ components is^[1]:

\ln(\gamma _{i})={\frac {\displaystyle \sum _{j=1}^{n}{x_{j}\tau _{ji}G_{ji}}}{\displaystyle \sum _{k=1}^{n}{x_{k}G_{ki}}}}+\sum _{j=1}^{n}{\frac {x_{j}G_{ij}}{\displaystyle \sum _{k=1}^{n}{x_{k}G_{kj}}}}{\left({\tau _{ij}-{\frac {\displaystyle \sum _{m=1}^{n}{x_{m}\tau _{mj}G_{mj}}}{\displaystyle \sum _{k=1}^{n}{x_{k}G_{kj}}}}}\right)}

(1.1)

with

G_{ij}={\text{exp}}\left({-\alpha _{ij}\tau _{ij}}\right)

(1.2)

\alpha _{ij}=\alpha _{ij_{0}}+\alpha _{ij_{1}}T

(1.3)

\tau _{ij}=A_{ij}+{\frac {B_{ij}}{T}}+{\frac {C_{ij}}{T^{2}}}+D_{ij}\ln {\left({T}\right)}+E_{ij}T^{F_{ij}}

(1.4)

For derivative calculations, it becomes convenient to further compartmentalize the general NRTL equation by abstracting the summation terms. While this does introduce an additional substitution for chain rule differentiation, it does make the final equation more readable.

\ln(\gamma _{i})={\frac {S_{1_{ij}}}{S_{2_{ik}}}}+\sum _{j=1}^{n}{\frac {x_{j}G_{ij}}{S_{2_{jk}}}}{\left({\tau _{ij}-{\frac {S_{1_{jm}}}{S_{2_{jk}}}}}\right)}

(1.5)

with

Sum type 1:

S_{1_{ij}}=\displaystyle \sum _{j=1}^{n}{x_{j}\tau _{ji}G_{ji}}

(1.6)

Sum type 2:

S_{2_{ij}}=\displaystyle \sum _{j=1}^{n}{x_{j}G_{ji}}

(1.7)

Derivatives of system variables[edit]

The system variables are intrinsic to a system being observed or predicted. These include several directly measurable variables and many indirectly measurable variables. Only the directly measurable system variables need to be calculated for the NRTL model.

Directly measurable system variables:

$T$ , temperature
$P$ , pressure
${\vec {x}}$ , mixture composition

Temperature[edit]

These, along with the composition derivatives, are the primary derivatives of interest, the reason for which will become obvious when reading the pressure derivatives section.

Adjustable parameters[edit]

Since the adjustable parameters are treated as constants during typical VLE calculations, their derivatives are straight forward degenerate solutions:

Non-randomness[edit]

{\begin{matrix}\displaystyle \left({\frac {\partial \alpha _{ij_{0}}}{\partial T}}\right)_{P,{\vec {N}}}=0&\displaystyle \left({\frac {\partial \alpha _{ij_{1}}}{\partial T}}\right)_{P,{\vec {N}}}=0\end{matrix}}

(2.1-1)

Interaction[edit]

{\begin{matrix}\displaystyle \left({\frac {\partial A_{ij}}{\partial T}}\right)_{P,{\vec {N}}}=0&\displaystyle \left({\frac {\partial B_{ij}}{\partial T}}\right)_{P,{\vec {N}}}=0&\displaystyle \left({\frac {\partial C_{ij}}{\partial T}}\right)_{P,{\vec {N}}}=0&\displaystyle \left({\frac {\partial D_{ij}}{\partial T}}\right)_{P,{\vec {N}}}=0&\displaystyle \left({\frac {\partial E_{ij}}{\partial T}}\right)_{P,{\vec {N}}}=0&\displaystyle \left({\frac {\partial F_{ij}}{\partial T}}\right)_{P,{\vec {N}}}=0\end{matrix}}

(2.1.1-1)

Non-randomness term[edit]

The non randomness term has a similarly simple series of temperature derivatives, being linear with respect to temperature.

First order:

\left({\frac {\partial \alpha _{ij}}{\partial T}}\right)_{P,{\vec {N}}}=\alpha _{ij_{1}}

(2.1.2-1)

Second and higher order:

\left({\frac {\partial ^{n}\alpha _{ij}}{\partial T^{n}}}\right)_{P,{\vec {N}}}=0

(2.1.2-2)

Interaction term[edit]

The interaction term can be conveniently expressed in terms of the derivative order, which becomes more or less obvious after a couple of iterations:

First order:

\left({\frac {\partial \tau _{ij}}{\partial T}}\right)_{P,{\vec {N}}}=-{\frac {B_{ij}}{T^{2}}}-{\frac {2C_{ij}}{T^{3}}}+{\frac {D_{ij}}{T}}+E_{ij}F_{ij}T^{F_{ij}-1}

(2.1.3-1)

Second order:

\left({\frac {\partial ^{2}\tau _{ij}}{\partial T^{2}}}\right)_{P,{\vec {N}}}={\frac {2B_{ij}}{T^{3}}}+{\frac {6C_{ij}}{T^{4}}}-{\frac {D_{ij}}{T^{2}}}+E_{ij}F_{ij}\left(F_{ij}-1\right)T^{F_{ij}-2}

(2.1.3-2)

Higher order: {{NumBlk|| $\left({\frac {\partial ^{n}\tau _{ij}}{\partial T^{n}}}\right)_{P,{\vec {N}}}=\left(-1\right)^{n}\left(n!\right){\frac {B_{ij}}{T^{n+1}}}+\left(-1\right)^{n}\left((n+1)!\right){\frac {C_{ij}}{T^{n+2}}}+\left(-1\right)^{n+1}\left((n-1)!\right){\frac {D_{ij}}{T^{n}}}+E_{ij}T^{F_{ij}-n}\prod _{k=0}^{n-1}{\left(F_{ij}-k\right)}$ |2.1.3.-3}

First order[edit]

Interaction energy term[edit]

\left({\frac {\partial G_{ij}}{\partial T}}\right)_{P,{\vec {N}}}=-\left(\alpha _{ij}\left({\frac {\partial \tau _{ij}}{\partial T}}\right)_{P,{\vec {N}}}+\tau _{ij}\left({\frac {\partial \alpha _{ij}}{\partial T}}\right)_{P,{\vec {N}}}\right){\text{exp}}\left({-\alpha _{ij}\tau _{ij}}\right)

(2.1.4.1-1)

\left({\frac {\partial G_{ij}}{\partial T}}\right)_{P,{\vec {N}}}=-\left(\alpha _{ij}\left({\frac {\partial \tau _{ij}}{\partial T}}\right)_{P,{\vec {N}}}+\tau _{ij}\left({\frac {\partial \alpha _{ij}}{\partial T}}\right)_{P,{\vec {N}}}\right)G_{ij}

(2.1.4.1-2)

Sum type 1[edit]

\left({\frac {\partial S_{1_{ij}}}{\partial T}}\right)_{P,{\vec {N}}}=\displaystyle \sum _{j=1}^{n}{x_{j}\left(\tau _{ji}\left({\frac {\partial G_{ji}}{\partial T}}\right)_{P,{\vec {N}}}+G_{ji}\left({\frac {\partial \tau _{ji}}{\partial T}}\right)_{P,{\vec {N}}}\right)}

(2.1.4.2-1)

Sum type 2[edit]

\left({\frac {\partial S_{1_{ij}}}{\partial T}}\right)_{P,{\vec {N}}}=\displaystyle \sum _{j=1}^{n}{x_{j}\left({\frac {\partial G_{ji}}{\partial T}}\right)_{P,{\vec {N}}}}

(2.1.4.3-1)

Main equation[edit]

\left({\frac {\partial \ln {\gamma _{i}}}{\partial T}}\right)_{P,{\vec {N}}}={\frac {S_{2_{ik}}\left({\frac {\partial S_{1_{ij}}}{\partial T}}\right)_{T,{\vec {N}}}-S_{1_{ij}}\left({\frac {\partial S_{2_{ik}}}{\partial T}}\right)_{T,{\vec {N}}}}{{S_{2_{ik}}}^{2}}}+\sum _{j=1}^{n}{x_{j}{\frac {S_{2_{jk}}\left(G_{ij}\left(\left({\frac {\partial \tau _{ij}}{\partial T}}\right)_{P,{\vec {N}}}-{\frac {S_{2_{jk}}\left({\frac {\partial S_{1_{jm}}}{\partial T}}\right)_{P,{\vec {N}}}-S_{1_{jm}}\left({\frac {\partial S_{2_{jk}}}{\partial T}}\right)_{P,{\vec {N}}}}{{S_{2_{jk}}}^{2}}}\right)+\left(\tau _{ij}-{\frac {S_{1_{jm}}}{S_{2_{jk}}}}\right)\left({\frac {\partial G_{ij}}{\partial T}}\right)_{P,{\vec {N}}}\right)+G_{ij}\left(\tau _{ij}-{\frac {S_{1_{jm}}}{S_{2_{jk}}}}\right)\left({\frac {\partial S_{2_{jk}}}{\partial T}}\right)_{P,{\vec {N}}}}{{S_{2_{jk}}}^{2}}}}

(2.1.4.4-1)

Second order[edit]

Third order[edit]

Pressure[edit]

These are the least interesting, though still very important and useful, derivatives. Since the pressure derivatives are evaluated at constant temperature and composition and none of the terms involved are explicit functions of pressure, all of the derivative expressions are essentially derivatives of a constant scalar term, which is zero. All of the partial derivatives are listed below for sake of complete coverage of the topic.