Page:Elementary Principles in Statistical Mechanics (1902).djvu/228

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204

SYSTEMS COMPOSED OF MOLECULES.

{\frac {\psi _{\rm {gen}}-\epsilon }{\Theta }}=\eta _{\rm {gen}},

(549)

which corresponds to the equation

{\frac {\psi -\epsilon }{\Theta }}=\eta ,

(550)

we have

\psi _{\rm {gen}}=\psi +\Theta \log {\nu _{1}}!\ldots {\nu _{h}}!,

and

\mathrm {H} -\eta _{\rm {gen}}={\frac {\Omega +\mu _{1}\nu _{1}\ldots +\mu _{h}\nu _{h}-\psi _{\rm {gen}}}{\Theta }}.

(551)

This will have a maximum when^[1]

{\frac {d\psi _{\rm {gen}}}{d\nu _{1}}}=\mu _{1},\qquad {\frac {d\psi _{\rm {gen}}}{d\nu _{2}}}=\mu _{2},\qquad \mathrm {etc.}

(552)

Distinguishing values corresponding to this maximum by accents, we have approximately, when $\nu _{1},\ldots \nu _{h}$ are of the same order of magnitude as the numbers of molecules in ordinary bodies,

{\begin{aligned}\mathrm {H} -\eta _{\rm {gen}}&={\frac {\Omega +\mu _{1}\nu _{1}\ldots +\mu _{h}\nu _{h}-\psi _{\rm {gen}}}{\Theta }}\\&={\frac {\Omega +\mu _{1}\nu _{1}'\ldots +\mu _{h}\nu _{h}'-\psi _{\rm {gen}}'}{\Theta }}\\&\!\!\!\!\!\!\!\!\!\!\!\!\!\!{}-{\bigg (}{\frac {d^{2}\psi _{\rm {gen}}}{d\nu _{1}^{2}}}{\bigg )}'{\frac {(\Delta \nu _{1})^{2}}{2\Theta }}-{\bigg (}{\frac {d^{2}\psi _{\rm {gen}}}{d\nu _{1}\,d\nu _{2}}}{\bigg )}'{\frac {\Delta \nu _{1}\Delta \nu _{2}}{\Theta }}\ldots -{\bigg (}{\frac {d^{2}\psi _{\rm {gen}}}{d\nu _{h}^{2}}}{\bigg )}'{\frac {(\Delta \nu _{h})^{2}}{2\Theta }}\end{aligned}},

(553)

e^{\mathrm {H} -\eta _{\rm {gen}}}=e^{C}e^{-{\big (}{\frac {d^{2}\psi _{\rm {gen}}}{d\nu _{1}^{2}}}{\big )}'{\frac {(\Delta \nu _{1})^{2}}{2\Theta }}-{\big (}{\frac {d^{2}\psi _{\rm {gen}}}{d\nu _{1}\,d\nu _{2}}}{\big )}'{\frac {\Delta \nu _{1}\Delta \nu _{2}}{\Theta }}\ldots -{\big (}{\frac {d^{2}\psi _{\rm {gen}}}{d\nu _{h}^{2}}}{\big )}'{\frac {(\Delta \nu _{h})^{2}}{2\Theta }}},

(554)

where

C={\frac {\Omega +\mu _{1}\nu _{1}'\ldots +\mu _{h}\nu _{h}'-\psi _{\rm {gen}}'}{\Theta }},

(555)

and

\Delta \nu _{1}=\nu _{1}-\nu _{1}',\quad \Delta \nu _{2}=\nu _{2}-\nu _{2}',\quad \mathrm {etc.}

(556)

This is the probability of the system (

\nu _{1}\ldots \nu _{h}

). The probabilty that the values of

\nu _{1},\ldots \nu _{h}

lie within given limits is given by the multiple integral

↑ Strictly speaking, $\psi _{\rm {gen}}$ is not determined as function of $\nu _{1},\ldots \nu _{h}$ , except for integral values of these variables. Yet we may suppose it to be determined as a continuous function by any suitable process of interpolation.

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[1] Strictly speaking, $\psi _{\rm {gen}}$ is not determined as function of $\nu _{1},\ldots \nu _{h}$ , except for integral values of these variables. Yet we may suppose it to be determined as a continuous function by any suitable process of interpolation.

[1]