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InverseJacobiSD

InverseJacobiSD[v,m]

gives the inverse Jacobi elliptic function .

Details

Mathematical function, suitable for both symbolic and numerical manipulation.
gives the value of for which .
InverseJacobiSD has branch cut discontinuities in the complex v plane with branch points at and infinity, and in the complex m plane with branch points at and infinity.
The inverse Jacobi elliptic functions are related to elliptic integrals.
For certain special arguments, InverseJacobiSD automatically evaluates to exact values.
InverseJacobiSD can be evaluated to arbitrary numerical precision.
InverseJacobiSD automatically threads over lists.

Examples

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Basic Examples (4)

Evaluate numerically:

Plot the function over a subset of the reals:

Plot over a subset of the complexes:

Series expansions at the origin:

Scope (29)

Numerical Evaluation (5)

Evaluate to high precision:

The precision of the input tracks the precision of the output:

Evaluate for complex arguments:

Evaluate InverseJacobiSD efficiently at high precision:

Compute average-case statistical intervals using Around:

Compute the elementwise values of an array:

Or compute the matrix InverseJacobiSD function using MatrixFunction:

Specific Values (4)

Simple exact values are generated automatically:

Value at infinity:

Find a real root of the equation :

Parity transformation is automatically applied:

Visualization (3)

Plot InverseJacobiSD for various values of the second parameter :

Plot InverseJacobiSD as a function of its parameter :

Plot the real part of :

Plot the imaginary part of :

Function Properties (6)

InverseJacobiSD is not an analytic function:

It has both singularities and discontinuities:

is nondecreasing:

is injective:

is not surjective:

is neither non-negative nor non-positive:

is neither convex nor concave:

Differentiation and Integration (4)

First derivative:

Higher derivatives:

Plot higher derivatives for :

Differentiate InverseJacobiSD with respect to the second argument :

Definite integral of an odd function over an interval centered at the origin is 0:

Series Expansions (2)

Taylor expansion for around :

Plot the first three approximations for around :

Taylor expansion for around :

Plot the first three approximations for around :

Function Identities and Simplifications (2)

InverseJacobiSD is the inverse function of JacobiSD:

Compose with inverse function:

Use PowerExpand to disregard multivaluedness of the inverse function:

Other Features (3)

InverseJacobiSD threads elementwise over lists:

InverseJacobiSD can be applied to a power series:

TraditionalForm formatting:

Generalizations & Extensions (1)

InverseJacobiSD can be applied to a power series:

Applications (1)

Plot contours of constant real and imaginary parts in the complex plane:

Properties & Relations (1)

Obtain InverseJacobiSD from solving equations containing elliptic functions:

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