Quarter period

In mathematics, the quarter periods "K"("m") and "iK"′("m") are special functions that appear in the theory of elliptic functions.

The quarter periods "K" and "iK' " are given by

: $K(m)=int_0^{pi/2} frac{d heta}{sqrt {1-m sin^2 heta$

and

: $iK'(m) = iK(1-m).,$

Note that when "m" is a real number, 0 ≤ "m" ≤ 1, then both "K" and "K' " are real numbers. By convention, "K" is called the "real quarter period" and "iK' " is called the "imaginary quarter period". Note that any one of the numbers "m", "K", "K' ", or "K' "/"K" uniquely determines the others.

These functions appear in the theory of Jacobian elliptic functions; they are called "quarter periods" because the elliptic functions sn "u" and cn "u" are periodic functions with period 4"K".

Note that the quarter periods are essentially the elliptic integral of the first kind, by making the substitution "k"² = "m". In this case, one writes "K"("k") instead of "K"("m"), understanding the difference between the two depends notationally on whether "k" or "m" is used. This notational difference has spawned a terminology to go with it:
* "m" is called the parameter
* "m"₁ = 1 − "m" is called the complementary parameter
* "k" is called the elliptic modulus
* "k' " is called the complementary elliptic modulus, where ${k'}^2=m_1,!$
* $o!varepsilon,!$ the modular angle, where $k=sin o!varepsilon,!$
* $frac{pi}{2}-o!varepsilon,!$ the complementary modular angle. Note that: $m_1=sin^2left(frac{pi}{2}-o!varepsilon
ight)=cos^2 o!varepsilon.,!$

The elliptic modulus can be expressed in terms of the quarter periods as

: $k= extrm{ns} (K+iK'),!$

and

: $k'= extrm{dn} K,$

where ns and dn Jacobian elliptic functions.

The nome "q" is given by

: $q=exp (-pi K'/K).,$

The complementary nome is given by

: $q_1=exp (-pi K/K').,$

The real quarter period can be expressed as a Lambert series involving the nome:

: $K=frac{pi}{2} + 2pisum_{n=1}^infty frac{q^n}{1+q^{2n.,$

Additional expansions and relations can be found on the page for elliptic integrals.

References

* Milton Abramowitz and Irene A. Stegun, "Handbook of Mathematical Functions", (1964) Dover Publications, New York. ISBN 0486-61272-4. See chapters 16 and 17.

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