Page:A Treatise on Electricity and Magnetism - Volume 1.djvu/214

${\displaystyle {\begin{array}{ll}\iint Y_{i}Q_{j}dS&={\frac {4\pi a^{2}}{(2i+1)|{\underline {i}}}}S\left\{(-1)^{s}{\frac {|{\underline {2i-2s}}}{2^{i-s}|{\underline {i-s}}}}\sum \left(\lambda ^{i-2s}\mu ^{s}\right)\right\},\\\\&={\frac {4\pi a^{2}}{2i+1}}Y_{i(j)},\end{array}}}$

(60)

where ${\displaystyle Y_{i(j)}}$ denotes the value of ${\displaystyle Y_{i}}$ in equation (27) at the common pole of all the axes of ${\displaystyle Q_{j}}$.

140.] This result is a very important one in the theory of spherical harmonics, as it leads to the determination of the form of a series of spherical harmonics, which expresses a function having any arbitrarily assigned value at each point of a spherical surface.

For let ${\displaystyle F}$ be the value of the function at any given point of the sphere, say at the centre of gravity of the element of surface ${\displaystyle dS}$, and let ${\displaystyle Q_{i}}$ be the zonal harmonic of degree ${\displaystyle i}$ whose pole is the point ${\displaystyle P}$ on the sphere, then the surface-integral

${\displaystyle \iint FQ_{i}dS}$

extended over the spherical surface will be a spherical harmonic of degree ${\displaystyle i}$, because it is the sum of a number of zonal harmonics whose poles are the various elements ${\displaystyle dS}$, each being multiplied by ${\displaystyle FdS}$. Hence, if we make

${\displaystyle A_{i}Y_{i}={\frac {2i+1}{4\pi a^{2}}}\iint FQ_{i}dS,}$

(61)

we may expand F in the form

${\displaystyle F=A_{0}Y_{0}+A_{1}Y_{1}+\mathrm {etc} .+A_{i}Y_{i},}$

(62)

or

${\displaystyle F={\frac {1}{4\pi a^{2}}}\left\{\iint FQ_{0}dS+3\iint FQ_{1}dS+\mathrm {etc} .+(2i+1)\iint fQ_{i}dS\right\}.}$

(63)

This is the celebrated formula of Laplace for the expansion in a series of spherical harmonics of any quantity distributed over the surface of a sphere. In making use of it we are supposed to take a certain point ${\displaystyle P}$ on the sphere as the pole of the zonal harmonic ${\displaystyle Q_{i}}$, and to find the surface-integral

${\displaystyle \iint FQ_{i}dS}$

over the whole surface of the sphere. The result of this operation when multiplied by ${\displaystyle 2i+1}$ gives the value of ${\displaystyle A_{i}Y_{i}}$ at the point ${\displaystyle P}$, and by making ${\displaystyle P}$ travel over the surface of the sphere the value of ${\displaystyle A_{i}Y_{i}}$ at any other point may be found.