Difference between revisions of "Amplitude of an elliptic integral"
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z = F ( \phi , k ) = \int\limits _ { 0 } ^ \phi | z = F ( \phi , k ) = \int\limits _ { 0 } ^ \phi | ||
− | \frac{dt} \sqrt | + | \frac{dt} {\sqrt |
− | {1 - k ^ {2} \sin ^ {2} t } | + | {1 - k ^ {2} \sin ^ {2} t }} |
$$ | $$ | ||
Latest revision as of 16:27, 1 April 2020
The variable $ \phi $,
considered as a function of $ z $,
in an elliptic integral of the first kind
$$ z = F ( \phi , k ) = \int\limits _ { 0 } ^ \phi \frac{dt} {\sqrt {1 - k ^ {2} \sin ^ {2} t }} $$
in the normal Legendre form. The concept of the amplitude of an elliptic integral and the notation $ \phi = \mathop{\rm am} z $ were introduced by C.G.J. Jacobi in 1829. The amplitude of an elliptic integral is an infinite-valued periodic function of $ z $. The basic elliptic Jacobi functions $ \sin \mathop{\rm am} z = \mathop{\rm sn} z $, $ \cos \mathop{\rm am} z = \mathop{\rm cn} z $, $ \Delta \mathop{\rm am} z = \mathop{\rm dn} z $ are all single-valued. It is convenient, however (e.g. for purposes of tabulation), to consider an elliptic integral as a function $ F ( \phi , k) $ of the amplitude $ \phi $ and the modulus $ k $. See also Jacobi elliptic functions.
Amplitude of an elliptic integral. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Amplitude_of_an_elliptic_integral&oldid=45098