# Point charges and multipole expansion

by Shyan
Tags: charges, expansion, multipole, point
 P: 934 Consider the following charge distribution:A positive charge of magnitude Q is at the origin and there is a charge -Q on each of the x,y and z axes a distance d from the origin. I want to expand the potential of this charge distribution using spherical coordinates.Here's how I did it: $\phi=\frac {Q} {4\pi \varepsilon_0} \left[ \frac{1}{r} - \frac{1}{\sqrt{r^2+d^2-2rd \cos\theta}}- \frac{1}{\sqrt{r^2+d^2-2rd \cos\gamma_1}}- \frac{1}{\sqrt{r^2+d^2-2rd \cos\gamma_2}}\right]=\\ \frac {Q} {4\pi \varepsilon_0 r} \left[ 1 - \frac{1}{\sqrt{1+(\frac d r)^2-2 \frac d r \cos\theta}}- \frac{1}{\sqrt{1+(\frac d r)^2-2\frac d r \cos\gamma_1}}- \frac{1}{\sqrt{1+(\frac d r)^2-2\frac d r \cos\gamma_2}}\right]=\\ \frac {Q} {4\pi \varepsilon_0 r} \left[ 1-\sum_{n=0}^\infty P_n(\cos\theta) (\frac d r)^n-\sum_{n=0}^\infty P_n(\cos\gamma_1) (\frac d r)^n-\sum_{n=0}^\infty P_n(\cos\gamma_2) (\frac d r)^n \right]=\\ \frac {Q} {4\pi \varepsilon_0 r} \left[ 1-\sum_{n=0}^\infty P_n(\cos\theta) (\frac d r)^n-\sum_{n=0}^\infty \frac{4\pi}{2n+1} (\frac d r)^n\sum_{m=-n}^n Y^{m*}_n(\frac \pi 2,0) Y^m_n(\theta,\varphi)-\sum_{n=0}^\infty \frac{4\pi}{2n+1} (\frac d r)^n\sum_{m=-n}^n Y^{m*}_n(\frac \pi 2,\frac \pi 2) Y^m_n(\theta,\varphi)\right]$ The monopole term(n=0) is $\phi^{(1)}=-\frac{2Q}{4\pi \varepsilon_0 r }$,as it should be. My problem is, the dipole term(n=1) turns out to be complex.What's wrong? Thanks
 P: 934 The dipole term is: $\phi^{(2)}=\frac{Qd}{4\pi\varepsilon_0r^2} \left\{P_1(\cos\theta)- \frac{4\pi}{ 3 } \left[\left(Y^{-1*}_1(\frac \pi 2,0)+Y^{-1*}_1(\frac \pi 2,\frac \pi 2)\right) Y^{-1}_1(\theta,\varphi)\\+\left(Y^{0*}_1(\frac \pi 2,0)+Y^{0*}_1(\frac \pi 2,\frac \pi 2)\right)Y^0_1(\theta,\varphi)\\+\left(Y^{1*}_1(\frac \pi 2,0) +Y^{1*}_1(\frac \pi 2,\frac \pi 2)\right)Y^1_1(\theta,\varphi)\right]\right\}$ The definition I use for spherical harmonics is: $Y^m_n(\theta,\varphi)=\sqrt{ \frac{2n+1}{4\pi} \frac{ (n-m)! }{ (n+m)! } } P^m_n(\cos\theta) e^{im\varphi}$ So we have: $Y^{-1}_1=\frac 1 2 \sqrt{\frac{3}{2\pi}}\sin\theta e^{-i\varphi}\\ Y^0_1=\frac 1 2 \sqrt{\frac 3 {2\pi}}\cos\theta\\ Y^1_1=-\frac 1 2 \sqrt{\frac{3}{2\pi}}\sin\theta e^{i\varphi}\\$ And: $Y^{-1*}_1(\frac \pi 2,0)=\frac 1 2 \sqrt{\frac3 {2\pi}}\\ Y^{-1*}_1(\frac \pi 2,\frac \pi 2)=\frac 1 2 \sqrt{\frac3 {2\pi}}e^{i \frac \pi 2}=\pm i \frac 1 2 \sqrt{\frac3 {2\pi}}\\ Y^{0*}_1(\frac \pi 2,\varphi)=0\\ Y^{1*}_1(\frac \pi 2,0)=-\frac 1 2 \sqrt{\frac 3 {2\pi}}\\ Y^{1*}_1(\frac \pi 2,\frac \pi 2)=-\frac 1 2 \sqrt{\frac 3 {2\pi}}e^{-i \frac \pi 2}=\pm i \frac 1 2 \sqrt{\frac 3 {2\pi}}$ So we'll have: $\phi^{(2)}=\frac{Qd}{4\pi \varepsilon_0 r^2} \left\{ \cos\theta-\left( 1\pm i \right)\sin\theta e^{-i\varphi}+\left( -1\pm i \right)\sin\theta e^{i\varphi} \right\}=\\ \frac{Qd}{4\pi \varepsilon_0 r^2} \left\{ \cos\theta-\sin\theta e^{-i\varphi}\mp i \sin\theta e^{-i\varphi} -\sin\theta e^{i\varphi}\pm i \sin\theta e^{i\varphi} \right\}=\\ \frac{Qd}{4\pi \varepsilon_0 r^2} \left\{ \cos\theta-\sin\theta (e^{i\varphi}+e^{-i\varphi}) \pm i \sin\theta ( e^{i\varphi}-e^{-i\varphi} ) \right\}=\\ \frac{Qd}{2\pi \varepsilon_0 r^2} \left\{ \frac 1 2 \cos\theta-\sin\theta \left[ \cos\varphi \mp \sin\varphi\right] \right\}$ What's wrong? EDIT: I found what was wrong. Ok,another question.How can I decide which sign is the right one for the $\sin\varphi$? Thanks
 Sci Advisor HW Helper PF Gold P: 2,026 Point charges and multipole expansion $e^{i\pi/2}=+i$.
 P: 934 Ok,So we have: $\phi^{(2)}=\frac{Qd}{2\pi \varepsilon_0 r^2} \left[ \frac 1 2 \cos\theta - \sin\theta \left( \cos\varphi-\sin\varphi\right) \right]$ But we can also use the formulas $\vec{p}=\int \vec{r} \rho dV$ and $\phi^{(2)}=\frac{\vec{p}\cdot\vec{r}} {4\pi \varepsilon_0 r^3}$ and we should arrive at the same result.But when I use the charge density $\rho=Q \left[ \delta(x)\delta(y)\delta(z)-\delta(x-d)\delta(y)\delta(z)-\delta(x)\delta(y-d)\delta(z)-\delta(x)\delta(y)\delta(z-d) \right]$, I'll get $\vec{p}=-Qd(\hat{x}+\hat{y}+\hat{z})$ and $\phi^{(2)}=-\frac{Qd(x+y+z)}{4\pi \varepsilon_0 r^3}=-\frac{Qd}{4\pi \varepsilon_0 r^2}\left[ \cos\theta+\sin\theta \left(\cos\varphi+\sin\varphi\right)\right]$ which differs from the result obtained above.I can't see why this happens!