NevilleThetaC
NevilleThetaC[z,m]
gives the Neville theta function 
.
Details
- Mathematical function, suitable for both symbolic and numerical manipulation.
-
- NevilleThetaC[z,m] is a meromorphic function of
and has a complicated branch cut structure in the complex 
plane. - For certain special arguments, NevilleThetaC automatically evaluates to exact values.
- NevilleThetaC can be evaluated to arbitrary numerical precision.
- NevilleThetaC automatically threads over lists.
Examples
open allclose allBasic Examples (4)
Scope (29)
Numerical Evaluation (6)
The precision of the output tracks the precision of the input:
Evaluate efficiently at high precision:
Compute average-case statistical intervals using Around:
Compute the elementwise values of an array:
Or compute the matrix NevilleThetaC function using MatrixFunction:
Specific Values (4)
Values at corners of the fundamental cell:
NevilleThetaC for special values of elliptic parameter:
Find the first positive maximum of NevilleThetaC[x,1/4]:
Different NevilleThetaC types give different symbolic forms:
Visualization (3)
Plot the NevilleThetaC functions for various values of the parameter:
Plot NevilleThetaC as a function of its parameter 
:
![TemplateBox[{z, {1, /, 2}}, NevilleThetaC]](Files/NevilleThetaC.en/6.png "TemplateBox[{z, {1, /, 2}}, NevilleThetaC]"){kind=small}
![TemplateBox[{z, {1, /, 2}}, NevilleThetaC]](Files/NevilleThetaC.en/7.png "TemplateBox[{z, {1, /, 2}}, NevilleThetaC]"){kind=small}
Function Properties (12)
The real domain of NevilleThetaC:
The complex domain of NevilleThetaC:
Approximate function range of ![TemplateBox[{x, 0}, NevilleThetaC]](Files/NevilleThetaC.en/8.png "TemplateBox[{x, 0}, NevilleThetaC]"){kind=small}
:
Approximate function range of ![TemplateBox[{x, 1}, NevilleThetaC]](Files/NevilleThetaC.en/9.png "TemplateBox[{x, 1}, NevilleThetaC]"){kind=small}
:
NevilleThetaC is an even function:
NevilleThetaC threads elementwise over lists:
![TemplateBox[{x, m}, NevilleThetaC]](Files/NevilleThetaC.en/10.png "TemplateBox[{x, m}, NevilleThetaC]"){kind=small}
is an analytic function of 
for 
:
![TemplateBox[{x, {1, /, 3}}, NevilleThetaC]](Files/NevilleThetaC.en/13.png "TemplateBox[{x, {1, /, 3}}, NevilleThetaC]"){kind=small}
is neither non-decreasing nor non-increasing:
![TemplateBox[{x, {1, /, 3}}, NevilleThetaC]](Files/NevilleThetaC.en/14.png "TemplateBox[{x, {1, /, 3}}, NevilleThetaC]"){kind=small}
![TemplateBox[{x, {1, /, 3}}, NevilleThetaC]](Files/NevilleThetaC.en/15.png "TemplateBox[{x, {1, /, 3}}, NevilleThetaC]"){kind=small}
![TemplateBox[{x, m}, NevilleThetaC]](Files/NevilleThetaC.en/16.png "TemplateBox[{x, m}, NevilleThetaC]"){kind=small}
is neither non-negative nor non-positive, except for 
:
![TemplateBox[{x, m}, NevilleThetaC]](Files/NevilleThetaC.en/18.png "TemplateBox[{x, m}, NevilleThetaC]"){kind=small}
has no singularities or discontinuities except for 
:
![TemplateBox[{x, m}, NevilleThetaC]](Files/NevilleThetaC.en/20.png "TemplateBox[{x, m}, NevilleThetaC]"){kind=small}
is affine only for 
and otherwise it is neither convex nor concave:
Format NevilleThetaC in TraditionalForm:
Differentiation (2)
Series Expansions (2)
Find the Taylor expansion using Series:
Plots of the first three approximations around 
:
Generalizations & Extensions (1)
NevilleThetaC can be applied to a power series:
Applications (4)
Properties & Relations (3)
Basic simplifications are automatically carried out:
All Neville theta functions are a multiple of shifted NevilleThetaC:
Text
Wolfram Research (1996), NevilleThetaC, Wolfram Language function, https://reference.wolfram.com/language/ref/NevilleThetaC.html.
CMS
Wolfram Language. 1996. "NevilleThetaC." Wolfram Language & System Documentation Center. Wolfram Research. https://reference.wolfram.com/language/ref/NevilleThetaC.html.
APA
Wolfram Language. (1996). NevilleThetaC. Wolfram Language & System Documentation Center. Retrieved from https://reference.wolfram.com/language/ref/NevilleThetaC.html