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WeierstrassPPrime
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BUILT-IN MATHEMATICA SYMBOL
Elliptic Integrals and Elliptic Functions
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WeierstrassP
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Elliptic Functions
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WeierstrassPPrime
WeierstrassPPrime
gives the derivative of the Weierstrass elliptic function
.
MORE INFORMATION
Mathematical function, suitable for both symbolic and numerical manipulation.
.
For certain special arguments,
WeierstrassPPrime
automatically evaluates to exact values.
WeierstrassPPrime
can be evaluated to arbitrary numerical precision.
EXAMPLES
CLOSE ALL
Basic Examples
(3)
Evaluate numerically:
Series expansion:
Evaluate numerically:
In[1]:=
Out[1]=
In[1]:=
Out[1]=
Series expansion:
In[1]:=
Out[1]=
Scope
(6)
Evaluate for complex arguments and invariants:
Evaluate to high precision:
The precision of the output tracks the precision of the input:
WeierstrassPPrime
threads element-wise over lists in its first argument:
WeierstrassPPrime
automatically evaluates to simpler functions for certain parameters:
TraditionalForm
formatting:
Applications
(3)
Conformal map from a triangle to the upper half-plane:
Map a triangle:
Uniformization of a generic elliptic curve
:
The parametrized uniformization:
Check the correctness of the uniformization:
Define Dixon trigonometric functions:
These functions are cubic generalizations of
Cos
and
Sin
:
Plot the Dixon trigonometric functions:
Series expansions of these functions:
Properties & Relations
(1)
Integrate expressions involving
WeierstrassPPrime
:
Possible Issues
(1)
Machine-precision input is insufficient to give a correct answer:
Use arbitrary-precision arithmetic to obtain a correct result:
Neat Examples
(1)
Weierstrass functions are doubly periodic over the complex plane:
SEE ALSO
WeierstrassP
TUTORIALS
Elliptic Integrals and Elliptic Functions
MORE ABOUT
Elliptic Functions
RELATED LINKS
MathWorld
The Wolfram Functions Site
New in 1 | Last modified in 3
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EXAMPLES
Basic Examples 
Scope