Category:Elliptic functions
Category:Elliptic functions For more information, see the article about Elliptic function. Subcategories There is 1 subcategory to ... category. Q Q-analogs Pages in category "Elliptic functions" There are 20 pages in this ...
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Jacobi's elliptic functions
Jacobi's elliptic functions In mathematics, the Jacobi elliptic functions are a set of basic elliptic functions, and auxiliary theta functions, that ...
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Weierstrass's elliptic functions
Weierstrass's elliptic functions In mathematics, Weierstrass's elliptic functions are a standard type of elliptic functions (the other is the Jacobi' ...
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Elliptic functions of Weierstrass   (translated from French)
Elliptic functions of Weierstrass This article is one ébauche ... by modifying it. In analyse complex , them elliptic functions of Weierstrass form the most important class of fonctions . Any elliptic function can be expressed using those.
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Talk:Weierstrass's elliptic functions
Talk:Weierstrass's elliptic functions The homogenity relation doesn't seem to ... relation can serve to define doubly periodic functions with arbitrary period pairs. It would probably ... Also, the statement that all doubly periodic functions with given periods form a field C ... what is true is that all meromorphic functions periodic under Λ form a field ...
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Elliptic function
Elliptic function In complex analysis, an elliptic function is, roughly speaking, a function defined ... which is periodic in two directions. The elliptic functions can be seen as analogs of the trigonometric functions (which have a single period only). ...
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Elliptic integral
Elliptic integral In integral calculus, elliptic integrals originally arose in connection with the ... Leonhard Euler. In the modern definition, an elliptic integral is any function f which can ... and c is a constant. In general, elliptic integrals cannot be expressed in terms of elementary functions; exceptions to this are when P ...
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Elliptic curve
Elliptic curve In mathematics, an elliptic curve is a plane curve defined by ... a more precise definition.) One finds that elliptic curves correspond to embeddings of the torus ... fields, and so it is said that elliptic curves are non-singular projective algebraic curves ... in a curious geometric way on an elliptic curve; the set of points of ...
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Elliptic function   (translated from French)
Elliptic function Inanalyze complex, one elliptic function is, coarsely speaking, one function defined ... doubly-periodical (periodical in two directions). The elliptic functions can be seen like analogues with fonctions ... which has only one period). Formally, an elliptic function is one function méromorphe F ...
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Elliptic operator
Elliptic operator In mathematics, an elliptic operator is one of the major types ... be defined on spaces of complex-valued functions, or some more general function-like objects ... positivity condition. An important example of an elliptic operator is the Laplacian. Equations of the ... P u = 0 \quad are called elliptic partial differential equations. Equations involving time, ...
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