The complete elliptic integral of the first kind 
, illustrated above as a function of the elliptic
modulus 
, is defined by
where 
is the incomplete elliptic
integral of the first kind and 
is the hypergeometric
function.
It is implemented in the Wolfram Language as EllipticK[m],
where 
is the parameter.
It satisfies the identity
 |
(4) |
where 
is a Legendre polynomial.
This simplifies to
 |
(5) |
for all complex values of 
except possibly for real 
with 
.
In addition, 
satisfies the identity
![[K(sqrt(1/2(1-sqrt((1-2k^2)^2))))]^2
=(pi^2)/4sum_(n=0)^infty[((2n-1)!!)/((2n)!!)]^3(2kk^')^(2n),](https://txtdot.deep-swarm.xyz/proxy/img?url=https%3A%2F%2Fmathworld.wolfram.com%2Fimages%2Fequations%2FCompleteEllipticIntegraloftheFirstKind%2FNumberedEquation3.svg) |
(6) |
where 
is the complementary
modulus. Amazingly, this reduces to the beautiful form
![[K(k)]^2=(pi^2)/4sum_(n=0)^infty[((2n-1)!!)/((2n)!!)]^3(2kk^')^(2n)](https://txtdot.deep-swarm.xyz/proxy/img?url=https%3A%2F%2Fmathworld.wolfram.com%2Fimages%2Fequations%2FCompleteEllipticIntegraloftheFirstKind%2FNumberedEquation4.svg) |
(7) |
for 
(Watson 1908, 1939).
can be computed in closed form for special values of 
,
where 
is a called an elliptic
integral singular value. Other special values include
satisfies
 |
(13) |
possibly modulo issues of 
, which can be derived from equation 17.4.17 in Abramowitz
and Stegun (1972, p. 593).
is related to the Jacobi
elliptic functions through
 |
(14) |
where the nome is defined by
 |
(15) |
with 
, where 
is the complementary
modulus.
satisfies the Legendre
relation
 |
(16) |
where 
and 
are complete elliptic integrals of the first and second
kinds, respectively, and 
and 
are the complementary integrals. The modulus 
is often suppressed for conciseness, so that 
and 
are often simply written 
and 
, respectively.
The integral 
for complementary modulus is given by
 |
(17) |
(Whittaker and Watson 1990, p. 501), and
(Whittaker and Watson 1990, p. 521), so
(cf. Whittaker and Watson 1990, p. 521).
The solution to the differential equation
![d/(dk)[k(1-k^2)(dy)/(dk)]-ky=0](https://txtdot.deep-swarm.xyz/proxy/img?url=https%3A%2F%2Fmathworld.wolfram.com%2Fimages%2Fequations%2FCompleteEllipticIntegraloftheFirstKind%2FNumberedEquation10.svg){kind=small} |
(22) |
(Zwillinger 1997, p. 122; Gradshteyn and Ryzhik 2000, p. 907) is
 |
(23) |
where the two solutions are illustrated above and 
.
Definite integrals of 
include
where 
(not to be confused with 
) is Catalan's constant.
See also
Complete Elliptic Integral of the Third Kind, Complete Elliptic Integral of the Second Kind, Elliptic Integral of the First Kind, Elliptic Integral Singular Value
Related Wolfram sites
http://functions.wolfram.com/EllipticIntegrals/EllipticK/
Explore with Wolfram|Alpha
References
Abramowitz, M. and Stegun, I. A. (Eds.). Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables, 9th printing. New York: Dover, 1972.Gradshteyn, I. S. and Ryzhik, I. M. Tables of Integrals, Series, and Products, 6th ed. San Diego, CA: Academic Press, 2000.Watson G. N. "The Expansion of Products of Hypergeometric Functions." Quart. J. Pure Appl. Math. 39, 27-51, 1907.Watson G. N. "A Series for the Square of the Hypergeometric Function." Quart. J. Pure Appl. Math. 40, 46-57, 1908.Watson, G. N. "Three Triple Integrals." Quart. J. Math., Oxford Ser. 2 10, 266-276, 1939.Whittaker, E. T. and Watson, G. N. A Course in Modern Analysis, 4th ed. Cambridge, England: Cambridge University Press, 1990.Zwillinger, D. Handbook of Differential Equations, 3rd ed. Boston, MA: Academic Press, p. 122, 1997.
Referenced on Wolfram|Alpha
Complete Elliptic Integral of the First Kind
Cite this as:
Weisstein, Eric W. "Complete Elliptic Integral of the First Kind." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/CompleteEllipticIntegraloftheFirstKind.html