Page:LorentzGravitation1915.djvu/3

${\displaystyle \Sigma (a)v_{a}K_{a}=0}$

(4)

§ 3. In Einstein's theory the gravitation field is determined by certain characteristic quantities ${\displaystyle g_{ab}}$, functions of ${\displaystyle x_{1},x_{2},x_{3},x_{4}}$, among which there are 10 different ones, as

${\displaystyle g_{ba}=g_{ab}}$

(5)

A point of fundamental importance is the connection between these quantities and the corresponding coefficients ${\displaystyle g'_{ab}}$, with which we are concerned, when by an arbitrary substitution ${\displaystyle x_{1},\dots x_{4}}$ are changed for other coordinates ${\displaystyle x'_{1},\dots x'_{4}}$. This connection is defined by the condition that

or shorter

be an invariant.

Putting

${\displaystyle dx_{a}=\Sigma (b)p_{ab}dx'_{b}}$

(6)

we find

${\displaystyle g'_{ab}=\Sigma (cd)p_{ca}p_{db}g_{cd}}$

(7)

Instead of (6) we shall also write

${\displaystyle dx'_{a}=\Sigma (b)\pi _{ba}dx_{b}}$

so that the set of quantities ${\displaystyle \pi _{ba}}$ may be called the inverse of the set ${\displaystyle p_{ab}}$. Similarly, we introduce a set of quantities ${\displaystyle \gamma _{ba}}$, the inverse of the set ${\displaystyle g_{ab}}$^[1].

We remark here that in virtue of (5) and (7) ${\displaystyle g'_{ba}=g'_{ab}}$ and that likewise ${\displaystyle \gamma _{ba}=\gamma _{ab}}$.

Our formulae will also contain the determinant of the quantities ${\displaystyle g_{ab}}$, which we shall denote by ${\displaystyle g}$, and the determinant ${\displaystyle p}$ of the coefficients ${\displaystyle p_{ab}}$ (absolute value: ${\displaystyle |p|}$). The determinant ${\displaystyle g}$ is always negative.

We may now, as has been shown by Einstein, deduce the motion of a material point in a gravitation field from the principle expressed by (3) if we take for the Lagrangian function

${\displaystyle L=-m{\frac {ds}{dt}}=-m{\sqrt {\Sigma (ab)g_{ab}v_{a}v_{b}}}}$

(8)

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