Special function/Catalogs/Catalog: Difference between revisions
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imported>Fredrik Johansson (consistency; fix some tex markup) |
imported>Fredrik Johansson |
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==Nonelementary integrals== | ==Nonelementary integrals== | ||
{| class="wikitable" | |||
!Function | |||
!Notation | |||
!Definition | |||
|- | |||
|[[Exponential integral]] | |||
|<math>\mathrm{Ei}(x)</math> | |||
|<math>\textstyle -\int_{-x}^{\infty} \frac{e^{-t}}{t} \, dt</math> | |||
|- | |||
|[[Logarithmic integral]] | |||
|<math>\mathrm{li}(x)</math> | |||
|<math>\textstyle \int_0^x \frac{1}{\ln t} \, dt</math> | |||
|} | |||
[[Trigonometric integral]]s: | |||
{| class="wikitable" | |||
!Function | |||
!Notation | |||
!Definition | |||
|- | |||
|[[Sine integral]] | |||
|<math>\mathrm{Si}(x)</math> | |||
|<math>\textstyle \int_0^x \frac{\sin t}{t} \, dt</math> | |||
|- | |||
|[[Hyperbolic sine integral]] | |||
|<math>\mathrm{Shi}(x)</math> | |||
|<math>\textstyle \int_0^x \frac{\sinh t}{t} \, dt</math> | |||
|- | |||
|[[Cosine integral]] | |||
|<math>\mathrm{Ci}(x)</math> | |||
|<math>\textstyle \gamma + \ln x + \int_0^x \frac{\cos t - 1}{t} \, dt</math> | |||
|- | |||
|[[Hyperbolic cosine integral]] | |||
|<math>\mathrm{Chi}(x)</math> | |||
|<math>\textstyle \gamma + \ln x + \int_0^x \frac{\cosh t - 1}{t} \, dt</math> | |||
|} | |||
Notes: <math>\gamma</math> is [[Euler's constant]] | |||
==Bessel function related== | ==Bessel function related== |
Revision as of 15:14, 25 April 2007
Special functions are mathematical functions that turn up so often that they have been named. This page lists the most common special functions by category, along with some of the properties that are important to functions belonging to each category. It must be stressed that there is no single way to categorize functions; any practical classification will contain overlapping categories.
Algebraic functions
Complex parts
Elementary transcendental functions
Name | Notation |
---|---|
Exponential function | , |
Natural logarithm | , |
Trigonometric functions
Name | Notation | Triangle formula | Exponential formula |
---|---|---|---|
Sine | Opposite / Hypotenuse | ||
Cosine | Adjacent / Hypotenuse | ||
Tangent | Opposite / Adjacent | ||
Cosecant | Hypotenuse / Opposite | ||
Secant | Hypotenuse / Adjacent | ||
Cotangent | Adjacent / Opposite |
Hyperbolic functions
Name | Notation | Exponential formula |
---|---|---|
Hyperbolic sine | ||
Hyperbolic cosine | ||
Hyperbolic tangent | ||
Hyperbolic cosecant | ||
Hyperbolic secant | ||
Hyperbolic cotangent |
Inverse trigonometric functions
Inverse hyperbolic functions
Name | Notation | Logarithmic formula |
---|---|---|
Inverse hyperbolic sine | ||
Inverse hyperbolic cosine | ||
Inverse hyperbolic tangent | ||
Inverse hyperbolic cosecant | ||
Inverse hyperbolic secant | ||
Inverse hyperbolic cotangent |
Other
Nonelementary integrals
Function | Notation | Definition |
---|---|---|
Exponential integral | ||
Logarithmic integral |
Function | Notation | Definition |
---|---|---|
Sine integral | ||
Hyperbolic sine integral | ||
Cosine integral | ||
Hyperbolic cosine integral |
Notes: is Euler's constant
Elliptic integrals
Orthogonal polynomials
See catalog of orthogonal polynomials for a more detailed listing.
Name | Notation | Interval | Weight function | , , , , ... |
---|---|---|---|---|
Chebyshev (first kind) | , , , , ... | |||
Chebyshev (second kind) | , , , , ... | |||
Legendre | ||||
Hermite | ||||
Laguerre | ||||
Associated Laguerre |
Name | Notation | Discrete formula | Continuous formula |
---|---|---|---|
Factorial | |||
Gamma function | |||
Double factorial |
|
||
Binomial coefficient | |||
Rising factorial | |||
Falling factorial | |||
Beta function | |||
Harmonic number | |||
Digamma function | |||
Polygamma function (of order m) |
- Incomplete gamma function
- Incomplete beta function
- Regularized gamma function
- Regularized beta function
- Barnes G-function
Notes:
- is Euler's constant
- The polygamma functions are generalized to continuous m by the Hurwitz zeta function
Hypergeometric functions
Note: many of the preceding functions are special cases of the following: