FresnelS
FresnelS[z]
gives the Fresnel integral ![TemplateBox[{z}, FresnelS]](Files/FresnelS.en/1.png "TemplateBox[{z}, FresnelS]"){kind=small}
.
Details
- Mathematical function, suitable for both symbolic and numerical manipulation.
- FresnelS[z] is given by
. - FresnelS[z] is an entire function of z with no branch cut discontinuities.
- For certain special arguments, FresnelS automatically evaluates to exact values.
- FresnelS can be evaluated to arbitrary numerical precision.
- FresnelS automatically threads over lists.
- FresnelS can be used with Interval and CenteredInterval objects. »
Examples
open allclose allBasic Examples (5)
Plot over a subset of the reals:
Plot over a subset of the complexes:
Series expansion at the origin:
Series expansion at Infinity:
Scope (39)
Numerical Evaluation (5)
Evaluate numerically to high precision:
The precision of the output tracks the precision of the input:
Evaluate for complex arguments:
Evaluate FresnelS efficiently at high precision:
Compute worst-case guaranteed intervals using Interval and CenteredInterval objects:
Or compute average-case statistical intervals using Around:
Compute the elementwise values of an array:
Or compute the matrix FresnelS function using MatrixFunction:
![(dTemplateBox[{x}, FresnelS])/(dx)=0](Files/FresnelS.en/3.png "(dTemplateBox[{x}, FresnelS])/(dx)=0"){kind=small}
Visualization (2)
![TemplateBox[{z}, FresnelS]](Files/FresnelS.en/4.png "TemplateBox[{z}, FresnelS]"){kind=small}
![TemplateBox[{z}, FresnelS]](Files/FresnelS.en/5.png "TemplateBox[{z}, FresnelS]"){kind=small}
Function Properties (9)
FresnelS is defined for all real and complex values:
Approximate function range of FresnelS:
FresnelS is an odd function:
FresnelS is an analytic function of x:
FresnelS is neither non-increasing nor non-decreasing:
FresnelS is not injective:
FresnelS is neither non-negative nor non-positive:
FresnelS has no singularities or discontinuities:
derivative:Integration (3)
Indefinite integral of FresnelS:
Definite integral of an odd function over an interval centered at the origin is 0:
Series Expansions (5)
Integral Transforms (2)
Function Identities and Simplifications (2)
Function Representations (5)
Relation to the error function Erf:
FresnelS can be represented as a DifferentialRoot:
FresnelS can be represented in terms of MeijerG:
TraditionalForm formatting:
Applications (5)
Intensity of a wave diffracted by a half‐plane:
A solution of the time‐dependent 1D Schrödinger equation for a sudden opening of a shutter:
Check the Schrödinger equation:
Plot the time‐dependent solution:
Plot of FresnelS along a circle in the complex plane:
Fractional derivative of Sin:
Derivative of order 
of Sin:
Plot a smooth transition between the derivative and integral of Sin:
Properties & Relations (6)
Use FullSimplify to simplify expressions containing Fresnel integrals:
Obtain FresnelS from integrals and sums:
Solve a differential equation:
Compare with Wronskian:
Possible Issues (2)
FresnelS can take large values for moderate‐size arguments:
Some references use a different convention for the Fresnel integrals:
Text
Wolfram Research (1996), FresnelS, Wolfram Language function, https://reference.wolfram.com/language/ref/FresnelS.html (updated 2022).
CMS
Wolfram Language. 1996. "FresnelS." Wolfram Language & System Documentation Center. Wolfram Research. Last Modified 2022. https://reference.wolfram.com/language/ref/FresnelS.html.
APA
Wolfram Language. (1996). FresnelS. Wolfram Language & System Documentation Center. Retrieved from https://reference.wolfram.com/language/ref/FresnelS.html