Gibbs-Duhem integration: Difference between revisions

Revision as of 12:16, 2 March 2007

CURRENTLY THIS ARTICLE IS UNDER CONSTRUCTION

History

The so-called Gibbs-Duhem Integration referes to a number of methods that couple molecular simulation techniques with thermodynamic equations in order to draw phase coexistence lines.

The method was proposed by Kofke (Ref 1-2).

Basic Features

Consider two thermodynamic phases: $a$ and $b$ , at thermodynamic equilibrium at certain conditions. The thermodynamic equilibrium implies:

Equal temperature in both phases: $T=T_{a}=T_{b}$ , i.e. thermal equilbirum.
Equal pressure in both phases $p=p_{a}=p_{b}$ , i.e. mechanical equilbrium.
Equal chemical potentials for the components $\mu _{i}=\mu _{ia}=\mu _{ib}$ , i.e. material equilibrium.

In addition if we are dealing with a statistical mechanics model, with certain parameters that we can represent as $\lambda$ , the model should be the same in both phases.

Example: phase equilibria of one-compoment system

Notice: The derivation that follows is just a particular route to perform the integration

Consider that at given conditions of $T,p,\lambda$ two phases of the systems are at equilibrium, this implies:

\mu _{\alpha }\left(T,p,\lambda \right)=\mu _{\beta }\left(T,p,\lambda \right)

Given the thermal equilibrium we can also write:

\beta \mu _{\alpha }\left(\beta ,\beta p,\lambda \right)=\beta \mu _{\beta }\left(\beta ,\beta p,\lambda \right)

When a differential change of the conditions is performed we wil have for any phase:

d\mu =\left({\frac {\partial \mu }{\partial T}}\right)_{p,\lambda }dT+\left({\frac {\partial \mu }{\partial p}}\right)_{T,\lambda }dp+\left({\frac {\partial \mu }{\partial \lambda }}\right)_{T,p}d\lambda .

Taking into account that $\mu$ is the Gibbs free energy per particle:

TO BE CONTINUED .. soon

@@ Line 9: / Line 9: @@
 == Basic Features ==
-Consider two thermodynamic phases: <math> \alpha, \beta </math>,  at thermodynamic equilibrium at certain conditions.
+Consider two thermodynamic phases: <math> a </math> and <math> b  </math>,  at thermodynamic equilibrium at certain conditions.
 The thermodynamic equilibrium implies:
-* Equal temperature in both phases: <math> T = T_{\alpha} = T_{\beta} </math>, i.e. thermal equilbirum.
+* Equal temperature in both phases: <math> T = T_{a} = T_{b} </math>, i.e. thermal equilbirum.
-* Equal pressure in both phases <math> p = p_{\alpha} = p_{\beta} </math>, i.e. mechanical equilbrium.
+* Equal pressure in both phases <math> p = p_{a} = p_{b} </math>, i.e. mechanical equilbrium.
-* Equal chemical potentials for the components <math> \mu_i = \mu_{i\alpha} = \mu_{i\beta} </math>, i.e. ''material'' equilibrium.
+* Equal chemical potentials for the components <math> \mu_i = \mu_{ia} = \mu_{ib} </math>, i.e. ''material'' equilibrium.
 In addition if we are dealing with a statistical mechanics model, with certain parameters that we can represent as <math> \lambda </math> , the

Gibbs-Duhem integration: Difference between revisions

Revision as of 12:16, 2 March 2007

Contents

History

Basic Features

Example: phase equilibria of one-compoment system

References

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Gibbs-Duhem integration: Difference between revisions

Revision as of 12:16, 2 March 2007

History

Basic Features

Example: phase equilibria of one-compoment system

References

Navigation menu

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