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Date: 21-9-2018
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The lemniscate functions arise in rectifying the arc length of the lemniscate. The lemniscate functions were first studied by Jakob Bernoulli and Giulio Fagnano. A historical account is given by Ayoub (1984), and an extensive discussion by Siegel (1969). The lemniscate functions were the first functions defined by inversion of an integral
(1) |
which was first done by Gauss, who noticed that
(2) |
where is the arithmetic-geometric mean (Borwein and Bailey 2003, p. 13).
Define the inverse lemniscate functions as
(3) |
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(4) |
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(5) |
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(6) |
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(7) |
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(8) |
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where is a hypergeometric function, is an incomplete elliptic integral of the first kind, is an elliptic integral of the second kind, and
(10) |
so that
(11) |
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(12) |
Now, there is an identity connecting and since
(13) |
so
(14) |
These functions can be written in terms of Jacobi elliptic functions,
(15) |
Now, if , then
(16) |
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(17) |
Let so ,
(18) |
(19) |
(20) |
and
(21) |
Similarly,
(22) |
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(23) |
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(24) |
(25) |
(26) |
and
(27) |
We know
(28) |
But it is true that
(29) |
so
(30) |
(31) |
(32) |
By expanding in a binomial series and integrating term by term, the arcsinlemn function can be written
(33) |
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(34) |
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(35) |
where is a Pochhammer symbol (Berndt 1994).
Ramanujan gave the following inversion formula for . If
(36) |
where
(37) |
is the constant obtained by letting and , and
(38) |
then
(39) |
(Berndt 1994).
Ramanujan also showed that if , then
(40) |
(41) |
(42) |
(43) |
and
(44) |
(Berndt 1994).
A generalized version of the lemniscate function can be defined by letting and . Write
(45) |
where is the constant obtained by setting and . Then
(46) |
and Ramanujan showed
(47) |
(Berndt 1994).
REFERENCES:
Ayoub, R. "The Lemniscate and Fagnano's Contributions to Elliptic Integrals." Arch. Hist. Exact Sci. 29, 131-149, 1984.
Berndt, B. C. Ramanujan's Notebooks, Part IV. New York: Springer-Verlag, pp. 245, and 247-255, 258-260, 1994.
Borwein, J. and Bailey, D. Mathematics by Experiment: Plausible Reasoning in the 21st Century. Wellesley, MA: A K Peters, 2003.
Siegel, C. L. Topics in Complex Function Theory, Vol. 1. New York: Wiley, 1969.
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