User:Atavoidirc/Functions

In mathematics, some functions or groups of functions are important enough to deserve their own names. This is a listing of articles which explain some of these functions in more detail. There is a large theory of special functions which developed out of statistics and mathematical physics. A modern, abstract point of view contrasts large function spaces, which are infinite-dimensional and within which most functions are 'anonymous', with special functions picked out by properties such as symmetry, or relationship to harmonic analysis and group representations.

Elementary functions[edit]

Elementary functions are functions built from basic operations (e.g. addition, exponentials, logarithms...)

Algebraic functions[edit]

Algebraic functions are functions that can be expressed as the solution of a polynomial equation with integer coefficients.

Polynomials: Can be generated solely by addition, multiplication, and raising to the power of a positive integer.
- Constant function: polynomial of degree zero, graph is a horizontal straight line
- Linear function: First degree polynomial, graph is a straight line.
- Quadratic function: Second degree polynomial, graph is a parabola.
- Cubic function: Third degree polynomial.
- Quartic function: Fourth degree polynomial.
- Quintic function: Fifth degree polynomial.
- Sextic function: Sixth degree polynomial.
Rational functions: A ratio of two polynomials.
nth root
- Square root: Yields a number whose square is the given one.
- Cube root: Yields a number whose cube is the given one.

Elementary transcendental functions[edit]

Transcendental functions are functions that are not algebraic.

Exponential function: raises a fixed number to a variable power.
Hyperbolic functions: formally similar to the trigonometric functions.
Logarithms: the inverses of exponential functions; useful to solve equations involving exponentials.
Power functions: raise a variable number to a fixed power; also known as Allometric functions; note: if the power is a rational number it is not strictly a transcendental function.
Periodic functions
- Trigonometric functions: sine, cosine, tangent, cotangent, secant, cosecant, exsecant, excosecant, versine, coversine, vercosine, covercosine, haversine, hacoversine, havercosine, hacovercosine, etc.; used in geometry and to describe periodic phenomena. See also Gudermannian function.

Special functions[edit]

Piecewise special functions[edit]

Indicator function: maps x to either 1 or 0, depending on whether or not x belongs to some subset.
Step function: A finite linear combination of indicator functions of half-open intervals.
- Heaviside step function: 0 for negative arguments and 1 for positive arguments. The integral of the Dirac delta function.
Sawtooth wave
Square wave
Triangle wave
Rectangular function
Floor function: Largest integer less than or equal to a given number.
Ceiling function: Smallest integer larger than or equal to a given number.
Sign function: Returns only the sign of a number, as +1 or −1.
Absolute value: distance to the origin (zero point)

Arithmetic functions[edit]

Sigma function: Sums of powers of divisors of a given natural number.
Euler's totient function: Number of numbers coprime to (and not bigger than) a given one.
Prime-counting function: Number of primes less than or equal to a given number.
Partition function: Order-independent count of ways to write a given positive integer as a sum of positive integers.
Möbius μ function: Sum of the nth primitive roots of unity, it depends on the prime factorization of n.
Prime omega functions
Chebyshev functions
Liouville function, λ(n) = (–1)^Ω(n)
Von Mangoldt function, Λ(n) = log p if n is a positive power of the prime p
Carmichael function

Antiderivatives of elementary functions[edit]


Name	Symbol	Formula
Logarithmic integral	$\operatorname {Li} (z)$	$\operatorname {Li} (z)=\int _{0}^{z}{\frac {\ln(t)}{t}}dt$
Exponential integral	$\operatorname {Ei} (z)$	$\operatorname {Ei} (z)=\int _{-\infty }^{z}{\frac {e^{t}}{t}}dt$
Exponential integral	$\operatorname {E_{1}} (z)$	$\operatorname {E_{1}} (z)=\int _{z}^{\infty }{\frac {e^{-t}}{t}}dt$
Sine integral	$\operatorname {Si} (z)$	$\operatorname {Si} (z)=\int _{0}^{z}{\frac {\sin(t)}{t}}dt$
Sine integral	$\operatorname {si} (z)$	$\operatorname {si} (z)=-\int _{z}^{\infty }{\frac {\sin(t)}{t}}dt$
Cosine integral	$\operatorname {Ci} (z)$	$\operatorname {Ci} (z)=-\int _{z}^{\infty }{\frac {\cos(t)}{t}}dt$
Cosine integral	$\operatorname {Cin} (z)$	$\operatorname {Cin} (z)=\int _{0}^{z}{\frac {1-\cos(t)}{t}}dt$
Error function	$\operatorname {erf} (z)$	$\operatorname {erf} (z)={\frac {2}{\sqrt {\pi }}}\int _{0}^{z}e^{-t^{2}}dt$
Complementary error function	$\operatorname {erfc} (z)$	$\operatorname {erfc} (z)=1-\operatorname {erf} (z)$
Fresnel integrall	$\operatorname {C} (z)$	$\operatorname {C} (z)=\int _{0}^{z}\cos(t^{2})dt$
Fresnel integrall	$\operatorname {S} (z)$	$\operatorname {S} (z)=\int _{0}^{z}\sin(t^{2})dt$
Dawson function	$\operatorname {D_{\pm }} (z)$	$\operatorname {D_{\pm }} (z)=e^{\mp x^{2}}\int _{0}^{z}e^{\pm t^{2}}dt$
Faddeeva function	$w(z)$	$w(z)=e^{-z^{2}}\operatorname {erfc} (-iz)$

Hypergeometric and related functions[edit]


Name	Notation	Formula
Gaussian Hypergeometric Function	$_{2}F_{1}(a,b;c;z)$	${\displaystyle {}_{2}F_{1}(a,b;c;z)=\sum _{n=0}^{\infty }{\frac {a^{\overline {n}}b^{\overline {n}}}{c^{\overline {n}}}}{\frac {z^{n}}{n!}}=1+{\frac {ab}{c}}{\frac {z}{1!}}+{\frac {a(a+1)b(b+1)}{c(c+1)}}{\frac {z^{2}}{2!}}+\cdots .}$
Confluent hypergeometric function	$M(a,b,z)$	$M(a,b,z)=\sum _{n=0}^{\infty }{\frac {a^{\overline {n}}z^{n}}{b^{\overline {n}}n!}}={}_{1}F_{1}(a;b;z)$
Confluent hypergeometric function	$M(a,b,z)$	$U(a,b,z)={\frac {\Gamma (1-b)}{\Gamma (a+1-b)}}M(a,b,z)+{\frac {\Gamma (b-1)}{\Gamma (a)}}z^{1-b}M(a+1-b,2-b,z)$
Generalized hypergeometric function	$_{p}F_{q}(a_{1},\dots ,a_{p};b_{1},\dots ,b_{q};z)$	$_{p}F_{q}(a_{1},\dots ,a_{p};b_{1},\dots ,b_{q};z)=\sum _{n=0}^{\infty }{\frac {a_{1}^{\overline {n}}\cdots a_{p}^{\overline {n}}}{b_{1}^{\overline {n}}\cdots b_{q}^{\overline {n}}}}{\frac {z^{n}}{n!}}$
Associated Legendre functions	$P_{\lambda }^{\mu }(z)$	$P_{\lambda }^{\mu }(z)={\frac {1}{\Gamma (1-\mu )}}\left[{\frac {1+z}{1-z}}\right]^{\mu /2}\,_{2}F_{1}\left(-\lambda ,\lambda +1;1-\mu ;{\frac {1-z}{2}}\right)$
Associated Legendre functions	$Q_{\lambda }^{\mu }(z)$	$Q_{\lambda }^{\mu }(z)={\frac {{\sqrt {\pi }}\ \Gamma (\lambda +\mu +1)}{2^{\lambda +1}\Gamma (\lambda +3/2)}}{\frac {e^{i\mu \pi }(z^{2}-1)^{\mu /2}}{z^{\lambda +\mu +1}}}\,_{2}F_{1}\left({\frac {\lambda +\mu +1}{2}},{\frac {\lambda +\mu +2}{2}};\lambda +{\frac {3}{2}};{\frac {1}{z^{2}}}\right)$
Meijer G-function	$G_{p,q}^{\,m,n}\!\left(\left.{\begin{matrix}a_{1},\dots ,a_{p}\\b_{1},\dots ,b_{q}\end{matrix}}\;\right\|\,z\right)$	$G_{p,q}^{\,m,n}\!\left(\left.{\begin{matrix}a_{1},\dots ,a_{p}\\b_{1},\dots ,b_{q}\end{matrix}}\;\right\|\,z\right)={\frac {1}{2\pi i}}\int _{L}{\frac {\prod _{j=1}^{m}\Gamma (b_{j}-s)\prod _{j=1}^{n}\Gamma (1-a_{j}+s)}{\prod _{j=m+1}^{q}\Gamma (1-b_{j}+s)\prod _{j=n+1}^{p}\Gamma (a_{j}-s)}}\,z^{s}\,ds$
Fox H-function	$H_{p,q}^{\,m,n}\!\left[z\left\|{\begin{matrix}(a_{1},A_{1})&\ldots &(a_{p},A_{p})\\(b_{1},B_{1})&\ldots &(b_{q},B_{q})\end{matrix}}\right.\right]$	${\textstyle H_{p,q}^{\,m,n}\!\left[z\left\|{\begin{matrix}(a_{1},A_{1})&\ldots &(a_{p},A_{p})\\(b_{1},B_{1})&\ldots &(b_{q},B_{q})\end{matrix}}\right.\right]={\frac {1}{2\pi i}}\int _{L}{\frac {\prod _{j=1}^{m}\Gamma (b_{j}+B_{j}s)\,\prod _{j=1}^{n}\Gamma (1-a_{j}-A_{j}s)}{\prod _{j=m+1}^{q}\Gamma (1-b_{j}-B_{j}s)\,\prod _{j=n+1}^{p}\Gamma (a_{j}+A_{j}s)}}z^{-s}\,ds}$

Iterated exponential and related functions[edit]

Other standard special functions[edit]

Lambert W function: Inverse of f(w) = w exp(w).
Lamé function
Mathieu function
Mittag-Leffler function
Painlevé transcendents
Parabolic cylinder function
Arithmetic–geometric mean

Miscellaneous functions[edit]

Ackermann function: in the theory of computation, a computable function that is not primitive recursive.
Dirac delta function: everywhere zero except for x = 0; total integral is 1. Not a function but a distribution, but sometimes informally referred to as a function, particularly by physicists and engineers.
Dirichlet function: is an indicator function that matches 1 to rational numbers and 0 to irrationals. It is nowhere continuous.
Thomae's function: is a function that is continuous at all irrational numbers and discontinuous at all rational numbers. It is also a modification of Dirichlet function and sometimes called Riemann function.
Kronecker delta function: is a function of two variables, usually integers, which is 1 if they are equal, and 0 otherwise.
Minkowski's question mark function: Derivatives vanish on the rationals.
Weierstrass function: is an example of continuous function that is nowhere differentiable

External links[edit]

Special functions : A programmable special functions calculator.
Special functions at EqWorld: The World of Mathematical Equations.

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