Page:A Treatise on Electricity and Magnetism - Volume 1.djvu/155

found for a particular position of ${\displaystyle P}$. To find the form of the function when the form of the surface is given and the position of ${\displaystyle P}$ is arbitrary, is a problem of far greater difficulty, though, as we have proved, it is mathematically possible.

Let us suppose the problem solved, and that the point ${\displaystyle P}$ is taken within the surface. Then for all external points the potential of the superficial distribution is equal and opposite to that of ${\displaystyle P}$. The superficial distribution is therefore centrobaric^[1], and its action on all external points is the same as that of a unit of negative electricity placed at ${\displaystyle P}$.

Method of Approximating to the Values of Coefficients of Capacity, &c.

102.] Let a region be completely bounded by a number of surfaces ${\displaystyle S_{0},S_{1},S_{2}}$, &c., and let ${\displaystyle K}$ be a quantity, positive or zero but not negative, given at every point of this region. Let ${\displaystyle V}$ be a function subject to the conditions that its values at the surfaces ${\displaystyle S_{1},S_{2}}$, &c. are the constant quantities ${\displaystyle C_{1},C_{2}}$, &c., and that at the surface ${\displaystyle S_{0}}$

${\displaystyle {\frac {dV}{d\nu }}=0,}$

(1)

where ${\displaystyle \nu }$ is a normal to the surface ${\displaystyle S_{0}}$. Then the integral

${\displaystyle Q={\frac {1}{8\pi }}\iiint K\left(\left({\frac {dV}{dx}}\right)^{2}+\left({\frac {dV}{dy}}\right)^{2}+\left({\frac {dV}{dz}}\right)^{2}\right)dx\ dy\ dz,}$

(2)

taken over the whole region, has a unique minimum when ${\displaystyle V}$ satisfies the equation

${\displaystyle {\frac {d}{dx}}K{\frac {dV}{dx}}+{\frac {d}{dy}}K{\frac {dV}{dy}}+{\frac {d}{dz}}K{\frac {dV}{dz}}=0}$

(3)

throughout the region, as well as the original conditions.

We have already shewn that a function ${\displaystyle V}$ exists which fulfils the conditions (1) and (3), and that it is determinate in value. We have next to shew that of all functions fulfilling the surface-conditions it makes ${\displaystyle Q}$ a minimum.

Let ${\displaystyle V_{0}}$ be the function which satisfies (1) and (3), and let

${\displaystyle V=V_{0}+U\,}$

(4)

be a function which satisfies (1).

It follows from this that at the surfaces ${\displaystyle S_{1},S_{2}}$, &c. ${\displaystyle U=0}$.

The value of ${\displaystyle Q}$ becomes

${\displaystyle Q={\frac {1}{8\pi }}\iiint \left\{K\left(\left({\frac {dV_{0}}{dx}}\right)^{2}+\mathrm {\&c.} \right)+K\left(\left({\frac {dU}{dx}}\right)^{2}+\mathrm {\&c.} \right)+2K\left({\frac {dV_{0}}{dx}}{\frac {dU}{dx}}+\mathrm {\&c.} \right)\right\}dx\ dy\ dz.}$

(5)

1. Thomson and Tait’s Natural Philosophy, § 526.