Schwere, Elektricität und Magnetismus:393

${\displaystyle \omega \,}$ is the derivative of a scalar function of position in space. This will appear from the following considerations:

The line-integral ${\displaystyle \int \omega \cdot d\rho \,}$ will vanish for any closed line, since it may be expressed as the surface-integral of ${\displaystyle \nabla \times \omega \,}$. (No. 60.) The line-integral taken from one given point ${\displaystyle P'\,}$ to another given point ${\displaystyle P''\,}$ is independent of the line between the points for which the integral is taken. (For, if two lines joining the same points gave different values, by reversing one we should obtain a closed line for which the integral would not vanish.) If we set ${\displaystyle u\,}$ equal to this line-integral, supposing ${\displaystyle P''\,}$ to be variable and ${\displaystyle P'\,}$ to be constant in position, ${\displaystyle u\,}$ will be a scalar function of the position of the point ${\displaystyle P''\,}$, satisfying the condition ${\displaystyle du=\omega \cdot d\rho \,}$, or, by No. 51, ${\displaystyle \nabla u=\omega \,}$. There will evidently be an infinite number of functions satisfying this condition, which will differ from one another by constant quantities.

If the region for which ${\displaystyle \nabla \times \omega =0\,}$ is unlimited, these functions will be single-valued. If the region is limited, but acyclic,*^[1] the functions will still be single-valued and satisfy the condition ${\displaystyle \nabla u=\omega \,}$ within the same region. If the region is cyclic, we may determine functions satisfying the condition ${\displaystyle \nabla u=\omega \,}$ within the region, but they will not necessarily be single-valued.

68. If ${\displaystyle \omega \,}$ is any vector function of position in space, ${\displaystyle \nabla \cdot \nabla \times \omega =0\,}$. This may be deduced directly from the definitions of No. 54.

The converse of this proposition will be proved hereafter.

69. If ${\displaystyle u\,}$ is any scalar function of position in space, we have by Nos. 52 and 54

${\displaystyle \nabla \cdot \nabla u=\left({\frac {d^{2}}{dx^{2}}}+{\frac {d^{2}}{dy^{2}}}+{\frac {d^{2}}{dz^{2}}}\right)u.\,}$

70. Def.—If ${\displaystyle \omega \,}$ is any vector function of position in space, we may define ${\displaystyle \nabla \cdot \nabla \omega \,}$ by the equation

${\displaystyle \nabla \cdot \nabla \omega =\left({\frac {d^{2}}{dx^{2}}}+{\frac {d^{2}}{dy^{2}}}+{\frac {d^{2}}{dz^{2}}}\right)\omega ,\,}$