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19 Elliptic IntegralsLegendre’s Integrals

§19.12 Asymptotic Approximations

With \psi\left(x\right) denoting the digamma function (§5.2(i)) in this subsection, the asymptotic behavior of K\left(k\right) and E\left(k\right) near the singularity at k=1 is given by the following convergent series:

where

19.12.3
d(m)=\psi\left(1+m\right)-\psi\left(\tfrac{1}{2}+m\right),
d(m+1)=d(m)-\frac{2}{(2m+1)(2m+2)},m=0,1,\dots,

with d(0)=2\ln 2.

For the asymptotic behavior of F\left(\phi,k\right) and E\left(\phi,k\right) as \phi\to\tfrac{1}{2}\pi- and k\to 1- see Kaplan (1948, §2), Van de Vel (1969), and Karp and Sitnik (2007).

Asymptotic approximations for \Pi\left(\phi,\alpha^{2},k\right), with different variables, are given in Karp et al. (2007). They are useful primarily when \ifrac{(1-k)}{(1-\sin\phi)} is either small or large compared with 1.