Page:The Meaning of Relativity - Albert Einstein (1922).djvu/96

We have, first, by (67),

${\displaystyle \Delta A_{\mu }=-\int _{0}\Gamma _{\alpha \beta }^{\mu }A^{\alpha }dx_{\beta }.}$

In this, ${\displaystyle \Gamma _{\alpha \beta }^{\mu }}$ is the value of this quantity at the variable point ${\displaystyle G}$ of the path of integration. If we put

${\displaystyle \xi ^{\mu }=(x_{\mu })_{G}-(x_{\mu })_{P}}$

and denote the value of ${\displaystyle \Gamma _{\alpha \beta }^{\mu }}$ at ${\displaystyle P}$ by ${\displaystyle {\overline {\Gamma _{\alpha \beta }^{\mu }}}}$, then we have, with sufficient accuracy,

${\displaystyle \Gamma _{\alpha \beta }^{\mu }={\overline {\Gamma _{\alpha \beta }^{\mu }}}+{\frac {\delta {\overline {\Gamma _{\alpha \beta }^{\mu }}}}{\delta x_{\nu }}}\xi ^{\nu }.}$

Let, further, ${\displaystyle A^{\alpha }}$ be the value obtained from ${\displaystyle {\overline {A^{\alpha }}}}$ by a parallel displacement along the curve from ${\displaystyle P}$ to ${\displaystyle G}$. It may now easily be proved by means of (67) that ${\displaystyle A^{\mu }-{\overline {A^{\mu }}}}$ is infinitely small of the first order, while, for a curve of infinitely small dimensions of the first order, ${\displaystyle \Delta A^{\mu }}$ is infinitely small of the second order. Therefore there is an error of only the second order if we put

${\displaystyle A^{\alpha }={\overline {A^{\alpha }}}-{\overline {\Gamma _{\sigma \tau }^{\alpha }}}\;{\overline {\xi ^{\beta }}}.}$

If we introduce these values of ${\displaystyle \Gamma _{\alpha \beta }^{\mu }}$ and ${\displaystyle A^{\alpha }}$ into the integral, we obtain, neglecting all quantities of a higher order of small quantities than the second,

${\displaystyle \Delta A^{\mu }=-\left({\frac {\delta \Gamma _{\sigma \beta }^{\mu }}{\delta x_{\alpha }}}-\Gamma _{\rho \beta }^{\mu }\Gamma _{\sigma \alpha }^{\rho }\right)A^{\sigma }\int _{0}\xi ^{\alpha }d\xi ^{\beta }.}$

(85)

The quantity removed from under the sign of integration