Landen transformations

E621096

Landen transformations are classical iterative formulas in analysis that relate elliptic integrals (and associated means) at different moduli, enabling their efficient evaluation and simplification.

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Landen transformations canonical 1

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Statements (44)

Predicate Object
instanceOf iterative transformation
mathematical concept
transformation of elliptic integrals
appearsIn theory of elliptic functions
theory of modular equations
appliesTo complete elliptic integral of the first kind
complete elliptic integral of the second kind
category iterative algorithms in analysis
special functions identities
definesRecurrenceFor modulus sequence
sequence of means
effect relates E(k) to E(k_1) for transformed modulus k_1
relates K(k) to K(k_1) for transformed modulus k_1
field analysis
elliptic function theory
numerical analysis
hasApplication computational mathematics
engineering problems with elliptic integrals
theoretical physics involving elliptic integrals
hasFormula transformation mapping k to (1−√(1−k^2))/(1+√(1−k^2))
transformation mapping k to 2√k/(1+k)
hasType ascending Landen transformation
descending Landen transformation
historicalPeriod 18th century
namedAfter John Landen NERFINISHED
property can be iterated to obtain rapidly convergent sequences
preserve value of certain elliptic integrals under change of modulus
purpose acceleration of convergence in iterative schemes
efficient evaluation of elliptic integrals
simplification of elliptic integrals
relatedTo Gauss transformation for elliptic integrals
Gauss–Landen transformations NERFINISHED
duplication formulas for elliptic integrals
modular transformations
relatesTo AGM iteration
arithmetic–geometric mean NERFINISHED
complete elliptic integrals
elliptic integrals
elliptic modulus
usedFor derivation of AGM-based algorithms
evaluation of elliptic integrals with different moduli from a known value
high-precision computation of π via elliptic integrals
usesParameter complementary modulus k'
elliptic modulus k

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Referenced by (1)

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