<math>~U(\eta^',\theta^')\biggr|_{\mathrm{for}~\eta^' \ge \eta_0}</math>

<math>~=</math>

<math>~ \frac{2^{5 / 2} a^2}{3} \biggl[ \frac{1}{2\pi^2 a^2}\biggl(\frac{q}{a}\biggr) \frac{\sinh^3 \eta_0}{\cosh\eta_0} \biggr] \biggl\{ - \frac{3\pi^2}{2^{5/ 2}} \biggl[ \frac{\sinh^2\eta^'}{(\cosh \eta^' - \cos \theta^')^2} \biggr] +~ (\cosh \eta^' - \cos \theta^')^{1 / 2} </math>

<math>~ \times \sum\limits_{n=0}^\infty \epsilon_n \cos(n\theta^') Q_{n-1 / 2}(\cosh\eta^') B_n(\cosh\eta_0) \biggr\} \, , </math>

Wong (1973), Eq. (2.65)

<math>~B_n(\cosh\eta_0)</math>

<math>~\equiv</math>

<math>~ (n+\tfrac{1}{2})P_{n+1/2} (\cosh\eta_0)Q^2_{n-1/2} (\cosh\eta_0) - (n-\tfrac{3}{2})P_{n-1/2} (\cosh\eta_0)Q^2_{n+1/2} (\cosh\eta_0) \, . </math>

Wong (1973), Eq. (2.62)

<math>~P_\nu^{\mu+1}(z)</math>

<math>~=</math>

<math>~ (z^2 - 1)^{- 1 / 2} \biggl[ (\nu - \mu)z P_\nu^\mu(z) - (\nu + \mu)P_{\nu - 1}^\mu(z) \biggr] \, ; </math>

<math>~(z^2-1) \frac{dP_\nu^{\mu}(z)}{dz}</math>

<math>~=</math>

<math>~ (\nu + \mu)(\nu - \mu +1_(z^2-1)^{1 / 2} P_\nu^{\mu - 1}(z) - \mu zP_\nu^\mu(z) \, ; </math>

<math>~(\nu - \mu + 1)P_{\nu + 1}^{\mu}(z)</math>

<math>~=</math>

<math>~ (2\nu+1)zP_\nu^\mu (z) -(\nu + \mu)P_{\nu-1}^\mu(z) \, ; </math>

<math>~(z^2-1) \frac{dP_\nu^{\mu}(z)}{dz}</math>

<math>~=</math>

<math>~ \nu z P_\nu^{\mu }(z) - (\nu + \mu)P_{\nu-1}^\mu(z) \, . </math>

<math>~Q_{n-1 / 2}^m (\lambda)</math>

<math>~=</math>

<math>~(-1)^n \frac{\pi^{3/2}}{\sqrt{2} \Gamma(n-m+1 / 2)} (x^2-1)^{1 / 4} P_{m-1 / 2}^n(x) \, , </math>

<math>~P_{-1 / 2}(z)</math>

<math>~=</math>

<math>~ \frac{2}{\pi} \biggl[\frac{2}{z+1}\biggr]^{1 / 2} ~K\biggl( \sqrt{ \frac{z-1}{z+1}} \biggr) \, ; </math>

<math>~P_{-1 / 2}(\cosh\eta)</math>

<math>~=</math>

<math>~ \biggl[\frac{\pi}{2}~\cosh\biggl(\frac{\eta}{2}\biggr)\biggr]^{-1} ~K\biggl( \tanh \frac{\eta}{2} \biggr) \, ; </math>

Proof that these are the same expressions:

From standard relationships between hyperbolic functions, we know that,

So, if we let <math>~u \equiv \eta/2</math> and make the association,

Also,

Q.E.D.

<math>~Q_{-1 / 2}(z)</math>

<math>~=</math>

<math>~ \biggl[\frac{2}{z+1}\biggr]^{1 / 2} ~K\biggl( \sqrt{ \frac{2}{z+1} }\biggr) \, ; </math>

<math>~Q_{-1 / 2}(\cosh\eta)</math>

<math>~=</math>

<math>~2 e^{- \eta / 2} ~K(e^{-\eta} ) \, ; </math>

Proof that these are the same expressions:

Copying the Whipple's formula from §14.19 of DLMF,

then setting <math>~m = n = 0</math>, we have,

Step #1:   Associate … <math>z \leftrightarrow \cosh\xi</math>. Then,

Step #2:   Now making the association … <math>\Lambda \leftrightarrow z/\sqrt{z^2-1}</math>, we can write,

Step #3:   Again, making the association … <math>z \leftrightarrow \cosh\xi</math>, means,

which, apart from the leading factor of <math>~\pi^{-1 / 2}</math>, exactly matches the above expression.

Note: From Howard Cohl's online overview we find that the Whipple formula is slightly different from the one (quoted above) drawn from DLFM. According to Cohl the Whipple formula should be,

The DLMF expression needs to be multiplied by <math>~(-1)^m\Gamma (m + n + \tfrac{1}{2} )</math> in order to match the expression provided by Cohl; for the case being considered here of <math>~m=n=0</math>, this factor is precisely <math>~\Gamma(\tfrac{1}{2}) = \sqrt{\pi}</math> — see, for example, Wikipedia's discussion of the gamma function — which cancels this confusing factor of <math>~\pi^{-1 / 2}</math>.

<math>~P_{+1 / 2}(z)</math>

<math>~=</math>

<math>~ \frac{2}{\pi} \biggl[ z + \sqrt{z^2-1} \biggr]^{1 / 2} ~E\biggl( \sqrt{ \frac{2(z^2-1)^{1 / 2}}{z + (z^2-1)^{1 / 2}}} \biggr) \, ; </math>

<math>~P_{+ 1 / 2}(\cosh\eta)</math>

<math>~=</math>

<math>~ \frac{2}{\pi}~e^{\eta/2} ~E\biggl( \sqrt{1-e^{-2\eta}} \biggr) \, ; </math>

Proof that these are the same expressions:

If we associate,

It also means that,

Q.E.D.

<math>~Q_{+ 1 / 2}(z)</math>

<math>~=</math>

<math>~z \biggl[\frac{2}{z+1}\biggr]^{1 / 2} ~K\biggl( \sqrt{ \frac{2}{z+1} }\biggr) - \biggl[2(z+1)\biggr]^{1 / 2} E\biggl( \sqrt{\frac{2}{z+1}} \biggr) \, . </math>

<math>~P_{-1 / 2}(x)</math>

<math>~=</math>

<math>~ \frac{2}{\pi} ~K\biggl( \sqrt{ \frac{1-x}{2} } \biggr) \, ; </math>

<math>~P_{-1 / 2}(\cos\theta)</math>

<math>~=</math>

<math>~ \frac{2}{\pi} ~K\biggl( \sin \frac{\theta}{2}\biggr) \, ; </math>

<math>~Q_{-1 / 2}(x)</math>

<math>~=</math>

<math>~ K\biggl( \sqrt{ \frac{1+x}{2} } \biggr) \, ; </math>

<math>~P_{+1 / 2}(x)</math>

<math>~=</math>

<math>~ \frac{2}{\pi} \biggl[2E\biggl( \sqrt{ \frac{1-x}{2} } \biggr) - ~K\biggl( \sqrt{ \frac{1-x}{2} } \biggr) \biggr] \, ; </math>

<math>~Q_{+ 1 / 2}(x)</math>

<math>~=</math>

<math>~ K\biggl( \sqrt{ \frac{1+x}{2} } \biggr) - 2E\biggl( \sqrt{ \frac{1+x}{2} } \biggr)\, ; </math>

<math>~(m - \tfrac{1}{2})P_{m-1 / 2}(z)</math>

<math>~=</math>

<math>~ [2m-2]zP_{m-3 / 2} (z) -(m - \tfrac{3}{2} )P_{m - 5 / 2} (z) </math>

<math>~\Rightarrow ~~~(2m -1)P_{m - 1 / 2}(z)</math>

<math>~=</math>

<math>~ 4(m-1)zP_{m - 3 /2 } (z) - (2m -3)P_{m-5 / 2} (z) </math>

<math>~\Rightarrow ~~~P_{m - 1 / 2}(z)</math>

<math>~=</math>

<math>~\biggl[ \frac{ 4(m-1)zP_{m - 3 /2 } (z) - (2m -3)P_{m-5 / 2} (z) }{(2m -1)} \biggr] \, , </math>

where:

Note that, according to, for example, equation (8.731.5) of Gradshteyn & Ryzhik (1994),

Hence, the Green's function can straightforwardly be rewritten in terms of a simpler summation over just non-negative values of the index, <math>~m</math>.

Referencing equations (8.13.3) and (8.13.7), respectively, of Abramowitz & Stegun (1965), we see that for the smallest two values of the non-negative index, <math>~m</math>, the function, <math>~Q_{m- 1 / 2}(\chi)</math>, can be rewritten in terms of, the more familiar, complete elliptic integrals of the first and second kind. Specifically,

Finally, equation (8.5.3) from Abramowitz & Stegun (1965) or equation (8.832.4) of Gradshteyn & Ryzhik (1994) — also see equation (2) of Gil, Segura & Temme (2000) — provide the recurrence relation for all other values of the index, <math>~m</math>. Specifically, for all <math>~m \ge 2</math>,