Thermodynamic integration: Difference between revisions

Revision as of 10:29, 4 April 2007

Thermodynamic integration is used to calculate the difference in the Helmholtz energy function between two states. The path must be continuous and reversible. One has a continuously variable energy function $U_{\lambda }$ such that $\lambda =0$ , $U_{\lambda }=U_{0}$ and $\lambda =1$ , $U_{\lambda }=U$

\Delta A=A-A_{0}=\int _{0}^{1}d\lambda \langle {\frac {\partial U_{\lambda }}{\partial \lambda }}\rangle _{\lambda }

where

\left.U_{\lambda }\right.=(1-\lambda )U_{0}+\lambda U

.

@@ Line 1: / Line 1: @@
-Used to calculate the difference in the [[Helmholtz energy function]] between two states.
+'''Thermodynamic integration''' is used to calculate the difference in the [[Helmholtz energy function]] between two states.
 The path must be ''continuous'' and ''reversible''.
 One has a  continuously variable energy function <math>U_\lambda</math> such that

Thermodynamic integration: Difference between revisions

Revision as of 10:29, 4 April 2007

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