List of mathematical functions: Difference between revisions
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imported>Owen Reich m Added the rad function (as in the ABC Conjecture), and added a definition for the Carmichael function. |
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===Algebraic functions=== | ===Algebraic functions=== | ||
[[Algebraic function]]s are functions that can be expressed as the solution of a polynomial equation with | [[Algebraic function]]s are functions that can be expressed as the solution of a polynomial equation with polynomial coefficients. | ||
* [[Polynomial]]s: Can be generated solely by addition, multiplication, and raising to the power of a positive integer. | * [[Polynomial]]s: 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 | ** [[Constant function]]: polynomial of degree zero, graph is a horizontal straight line | ||
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* [[Prime omega function]]s | * [[Prime omega function]]s | ||
* [[Chebyshev function]]s | * [[Chebyshev function]]s | ||
* [[Liouville function]] | * [[Liouville function]]: <math>\Lambda(n)=(-1)^{\Omega(n)}</math> | ||
* [[Von Mangoldt function]], Λ(''n'') = log ''p'' if ''n'' is a positive power of the prime ''p'' | * [[Von Mangoldt function]], Λ(''n'') = log ''p'' if ''n'' is a positive power of the prime ''p'' | ||
* [[Carmichael function]] | * [[Carmichael function]]: <math>\lambda(n)=</math> The smallest integer <math>m</math> such that <math>a^m\equiv 1\pmod{n}</math> for all <math>a</math> coprime to <math>n</math> | ||
* [[Radical of an integer|Radical function]]: The product of the distinct prime factors of a positive integer input. | |||
===Antiderivatives of elementary functions=== | ===Antiderivatives of elementary functions=== | ||
Latest revision as of 21:25, 10 August 2025
Template:Short description 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.
See also List of types of functions
Elementary functions
Elementary functions are functions built from basic operations (e.g. addition, exponentials, logarithms...)
Algebraic functions
Algebraic functions are functions that can be expressed as the solution of a polynomial equation with polynomial 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.
- 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
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.
- Inverse hyperbolic functions: inverses of the hyperbolic functions, analogous to the inverse circular 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, Inverse trigonometric functions etc.; used in geometry and to describe periodic phenomena. See also Gudermannian function.
Special functions
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Piecewise special functions
Arithmetic functions
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- 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:
- Von Mangoldt function, Λ(n) = log p if n is a positive power of the prime p
- Carmichael function: The smallest integer such that for all coprime to
- Radical function: The product of the distinct prime factors of a positive integer input.
Antiderivatives of elementary functions
- Logarithmic integral function: Integral of the reciprocal of the logarithm, important in the prime number theorem.
- Exponential integral
- Trigonometric integral: Including Sine Integral and Cosine Integral
- Inverse tangent integral
- Error function: An integral important for normal random variables.
- Fresnel integral: related to the error function; used in optics.
- Dawson function: occurs in probability.
- Faddeeva function
- Gamma function: A generalization of the factorial function.
- Barnes G-function
- Beta function: Corresponding binomial coefficient analogue.
- Digamma function, Polygamma function
- Incomplete beta function
- Incomplete gamma function
- K-function
- Multivariate gamma function: A generalization of the Gamma function useful in multivariate statistics.
- Student's t-distribution
- Pi function
- Hypergeometric functions: Versatile family of power series.
- Confluent hypergeometric function
- Associated Legendre functions
- Meijer G-function
- Fox H-function
Other standard special functions
- 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
- 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
See also
- List of types of functions
- Test functions for optimization
- List of mathematical abbreviations
- List of special functions and eponyms
External links
- Special functions : A programmable special functions calculator.
- Special functions at EqWorld: The World of Mathematical Equations.