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- Jacobi_theta_functions_(notational_variations) abstract "There are a number of notational systems for the Jacobi theta functions. The notations given in the Wikipedia article define the original functionwhich is equivalent toHowever, a similar notation is defined somewhat differently in Whittaker and Watson, p. 487:This notation is attributed to "Hermite, H.J.S. Smith and some other mathematicians". They also defineThis is a factor of i off from the definition of as defined in the Wikipedia article. These definitions can be made at least proportional by x = za, but other definitions cannot. Whittaker and Watson, Abramowitz and Stegun, and Gradshteyn and Ryzhik all follow Tannery and Molk, in whichNote that there is no factor of π in the argument as in the previous definitions. Whittaker and Watson refer to still other definitions of . The warning in Abramowitz and Stegun, "There is a bewildering variety of notations...in consulting books caution should be exercised," may be viewed as an understatement. In any expression, an occurrence of should not be assumed to have any particular definition. It is incumbent upon the author to state what definition of is intended.".
- Jacobi_theta_functions_(notational_variations) wikiPageID "9508771".
- Jacobi_theta_functions_(notational_variations) wikiPageRevisionID "555031245".
- Jacobi_theta_functions_(notational_variations) hasPhotoCollection Jacobi_theta_functions_(notational_variations).
- Jacobi_theta_functions_(notational_variations) subject Category:Elliptic_functions.
- Jacobi_theta_functions_(notational_variations) subject Category:Theta_functions.
- Jacobi_theta_functions_(notational_variations) type Abstraction100002137.
- Jacobi_theta_functions_(notational_variations) type EllipticFunctions.
- Jacobi_theta_functions_(notational_variations) type Function113783816.
- Jacobi_theta_functions_(notational_variations) type MathematicalRelation113783581.
- Jacobi_theta_functions_(notational_variations) type Relation100031921.
- Jacobi_theta_functions_(notational_variations) type ThetaFunctions.
- Jacobi_theta_functions_(notational_variations) comment "There are a number of notational systems for the Jacobi theta functions. The notations given in the Wikipedia article define the original functionwhich is equivalent toHowever, a similar notation is defined somewhat differently in Whittaker and Watson, p. 487:This notation is attributed to "Hermite, H.J.S. Smith and some other mathematicians". They also defineThis is a factor of i off from the definition of as defined in the Wikipedia article.".
- Jacobi_theta_functions_(notational_variations) label "Jacobi theta functions (notational variations)".
- Jacobi_theta_functions_(notational_variations) sameAs m.02ph459.
- Jacobi_theta_functions_(notational_variations) sameAs Q17098064.
- Jacobi_theta_functions_(notational_variations) sameAs Q17098064.
- Jacobi_theta_functions_(notational_variations) sameAs Jacobi_theta_functions_(notational_variations).
- Jacobi_theta_functions_(notational_variations) wasDerivedFrom Jacobi_theta_functions_(notational_variations)?oldid=555031245.
- Jacobi_theta_functions_(notational_variations) isPrimaryTopicOf Jacobi_theta_functions_(notational_variations).