Page:AbrahamMinkowski1.djvu/4

 § 2. Mathematical auxiliary formulas.

The time differentiation for fixed space points, is represented by $$\tfrac{\partial}{\partial t}$$. The temporal change of a surface integral, extended over a surface whose points are moving with velocity $$\mathfrak{w}$$, namely

$\frac{d}{dt}\int df\ \mathfrak{A}_{n}=\int df\left\{ \frac{\partial'\mathfrak{A}}{\partial t}\right\} _{n}$|undefined

defines another kind of time differentiation of a vector

Furthermore, the derivative (with respect to time) which is related to moving points, is

This is connected with the temporal change of the volume integral of a vector, by the relations

From (2) and (2a) it follows

Accordingly it is given for the scalars:

From (1) and (3) it finally follows, with respect to the general rule

$\mathrm{curl}[\mathfrak{Aw}]=(\mathfrak{w}\nabla)\mathfrak{A}-(\mathfrak{A}\nabla)\mathfrak{w}+\mathfrak{A}\ \mathrm{div}\mathfrak{w}-\mathfrak{w}\ \mathrm{div}\mathfrak{A}$,

the relation

Since the time differentiation introduced in (2) follows the ordinary calculation rules, we have with respect to (2a)

$[\mathfrak{\dot{A}B}]+[\mathfrak{A\dot{B}}]=\frac{\delta}{\delta t}[\mathfrak{AB}]-[\mathfrak{AB}]\mathrm{div}\mathfrak{w}$|undefined

From this equation, together with the ones following from (4) and (2a)

$\begin{array}{l} \frac{\partial'\mathfrak{A}}{\partial t}=\mathfrak{\dot{A}}+\mathfrak{A}\ \mathrm{div}\mathfrak{w}-(\mathfrak{A}\nabla)\mathfrak{w},\\ \\\frac{\partial'\mathfrak{B}}{\partial t}=\mathfrak{\dot{B}}+\mathfrak{B}\ \mathrm{div}\mathfrak{w}-(\mathfrak{B}\nabla)\mathfrak{w},\end{array}$|undefined