Analytical Expression

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## Example: roots of polynomials

## Alternative definitions

## Analytic expression

## Comparison of different classes of expressions

## Dealing with non-closed-form expressions

### Transformation into closed-form expressions

### Differential Galois theory

### Mathematical modelling and computer simulation

## Closed-form number

## Numerical computations

## Conversion from numerical forms

## See also

## References

## Further reading

## External links

This article uses material from the Wikipedia page available here. It is released under the Creative Commons Attribution-Share-Alike License 3.0.

Analytical Expression

In mathematics, a **closed-form expression** is a mathematical expression that can be evaluated in a finite number of operations. It may contain constants, variables, certain "well-known" operations (e.g., + - × ÷), and functions (e.g., *n*th root, exponent, logarithm, trigonometric functions, and inverse hyperbolic functions), but usually no limit. The set of operations and functions admitted in a closed-form expression may vary with author and context.

Problems are said to be **tractable** if they can be solved in terms of a closed-form expression.

The solutions of any quadratic equation with complex coefficients can be expressed in closed form in terms of addition, subtraction, multiplication, division, and square root extraction, each of which is an elementary function. For example, the quadratic equation:

is tractable since its solutions can be expressed as closed-form expression, i.e. in terms of elementary functions:

Similarly solutions of cubic and quartic (third and fourth degree) equations can be expressed using arithmetic, square roots, and cube roots, or alternatively using arithmetic and trigonometric functions. However, there are quintic equations without closed-form solutions using elementary functions, such as *x*^{5} - *x* + 1 = 0.

An area of study in mathematics referred to broadly as Galois theory involves proving that no closed-form expression exists in certain contexts, based on the central example of closed-form solutions to polynomials.

Changing the definition of "well-known" to include additional functions can change the set of equations with closed-form solutions. Many cumulative distribution functions cannot be expressed in closed form, unless one considers special functions such as the error function or gamma function to be well known. It is possible to solve the quintic equation if general hypergeometric functions are included, although the solution is far too complicated algebraically to be useful. For many practical computer applications, it is entirely reasonable to assume that the gamma function and other special functions are well-known, since numerical implementations are widely available.

An **analytic expression** (or **expression in analytic form**) is a mathematical expression constructed using well-known operations that lend themselves readily to calculation. Similar to closed-form expressions, the set of well-known functions allowed can vary according to context but always includes the basic arithmetic operations (addition, subtraction, multiplication, and division), exponentiation to a real exponent (which includes extraction of the *n*th root), logarithms, and trigonometric functions.

However, the class of expressions considered to be analytic expressions tends to be wider than that for closed-form expressions. In particular, special functions such as the Bessel functions and the gamma function are usually allowed, and often so are infinite series and continued fractions. On the other hand, limits in general, and integrals in particular, are typically excluded.

If an analytic expression involves only the algebraic operations (addition, subtraction, multiplication, division and exponentiation to a rational exponent) and rational constants then it is more specifically referred to as an algebraic expression.

Closed-form expressions are an important sub-class of analytic expressions, which contain a bounded^{[]} or unbounded number of applications of well-known functions. Unlike the broader analytic expressions, the closed-form expressions do not include infinite series or continued fractions; neither includes integrals or limits. Indeed, by the Stone-Weierstrass theorem, any continuous function on the unit interval can be expressed as a limit of polynomials, so any class of functions containing the polynomials and closed under limits will necessarily include all continuous functions.

Similarly, an equation or system of equations is said to have a **closed-form solution** if, and only if, at least one solution can be expressed as a closed-form expression; and it is said to have an **analytic solution** if and only if at least one solution can be expressed as an analytic expression. There is a subtle distinction between a "closed-form *function*" and a "closed-form *number*" in the discussion of a "closed-form solution", discussed in (Chow 1999) and below. A closed-form or analytic solution is sometimes referred to as an **explicit solution**.

Arithmetic expressions | Polynomial expressions | Algebraic expressions | Closed-form expressions | Analytic expressions | Mathematical expressions | |
---|---|---|---|---|---|---|

Constant | Yes | Yes | Yes | Yes | Yes | Yes |

Variable | Yes | Yes | Yes | Yes | Yes | Yes |

Elementary arithmetic operation | Yes | Yes | Yes | Yes | Yes | Yes |

Factorial | Yes | Yes | Yes | Yes | Yes | Yes |

Integer exponent | No | Yes | Yes | Yes | Yes | Yes |

N-th root | No | No | Yes | Yes | Yes | Yes |

Rational exponent | No | No | Yes | Yes | Yes | Yes |

Irrational exponent | No | No | No | Yes | Yes | Yes |

Logarithm | No | No | No | Yes | Yes | Yes |

Trigonometric function | No | No | No | Yes | Yes | Yes |

Inverse trigonometric function | No | No | No | Yes | Yes | Yes |

Hyperbolic function | No | No | No | Yes | Yes | Yes |

Inverse hyperbolic function | No | No | No | Yes | Yes | Yes |

Gamma function | No | No | No | No | Yes | Yes |

Bessel function | No | No | No | No | Yes | Yes |

Special function | No | No | No | No | Yes | Yes |

Continued fraction | No | No | No | No | Yes | Yes |

Infinite series | No | No | No | No | Yes | Yes |

Formal power series | No | No | No | No | No | Yes |

Differential | No | No | No | No | No | Yes |

Limit | No | No | No | No | No | Yes |

Integral | No | No | No | No | No | Yes |

The expression:

is not in closed form because the summation entails an infinite number of elementary operations. However, by summing a geometric series this expression can be expressed in the closed-form:^{[1]}

The integral of a closed-form expression may or may not itself be expressible as a closed-form expression. This study is referred to as differential Galois theory, by analogy with algebraic Galois theory.

The basic theorem of differential Galois theory is due to Joseph Liouville in the 1830s and 1840s and hence referred to as **Liouville's theorem**.

A standard example of an elementary function whose antiderivative does not have a closed-form expression is:

whose antiderivative is (up to constants) the error function:

Equations or systems too complex for closed-form or analytic solutions can often be analysed by mathematical modelling and computer simulation.

Three subfields of the complex numbers **C** have been suggested as encoding the notion of a "closed-form number"; in increasing order of generality, these are the EL numbers, Liouville numbers, and elementary numbers. The **Liouville numbers**, denoted **L** (not to be confused with Liouville numbers in the sense of rational approximation), form the smallest *algebraically closed* subfield of **C** closed under exponentiation and logarithm (formally, intersection of all such subfields)--that is, numbers which involve *explicit* exponentiation and logarithms, but allow explicit and *implicit* polynomials (roots of polynomials); this is defined in (Ritt 1948, p. 60). **L** was originally referred to as **elementary numbers**, but this term is now used more broadly to refer to numbers defined explicitly or implicitly in terms of algebraic operations, exponentials, and logarithms. A narrower definition proposed in (Chow 1999, pp. 441-442), denoted **E**, and referred to as **EL numbers**, is the smallest subfield of **C** closed under exponentiation and logarithm--this need not be algebraically closed, and correspond to *explicit* algebraic, exponential, and logarithmic operations. "EL" stands both for "Exponential-Logarithmic" and as an abbreviation for "elementary".

Whether a number is a closed-form number is related to whether a number is transcendental. Formally, Liouville numbers and elementary numbers contain the algebraic numbers, and they include some but not all transcendental numbers. In contrast, EL numbers do not contain all algebraic numbers, but do include some transcendental numbers. Closed-form numbers can be studied via transcendental number theory, in which a major result is the Gelfond-Schneider theorem, and a major open question is Schanuel's conjecture.

For purposes of numeric computations, being in closed form is not in general necessary, as many limits and integrals can be efficiently computed.

There is software that attempts to find closed-form expressions for numerical values, including RIES,^{[2]}`identify` in Maple^{[3]} and SymPy,^{[4]} Plouffe's Inverter,^{[5]} and the Inverse Symbolic Calculator.^{[6]}

- Algebraic solution
- Finitary operation
- Numerical solution
- Computer simulation
- Symbolic regression
- Term (logic)
- Liouvillian function
- Elementary function

**^**Holton, Glyn. "Numerical Solution, Closed-Form Solution". Retrieved 2012.**^**Munafo, Robert. "RIES - Find Algebraic Equations, Given Their Solution". Retrieved 2012.**^**"identify".*Maple Online Help*. Maplesoft. Retrieved 2012.**^**"Number identification".*SymPy documentation*.**^**"Plouffe's Inverter". Retrieved 2012.**^**"Inverse Symbolic Calculator". Archived from the original on 29 March 2012. Retrieved 2012.

- Ritt, J. F. (1948),
*Integration in finite terms* - Chow, Timothy Y. (May 1999), "What is a Closed-Form Number?",
*American Mathematical Monthly*,**106**(5): 440-448, doi:10.2307/2589148, JSTOR 2589148 - Jonathan M. Borwein and Richard E. Crandall (January 2013), "Closed Forms: What They Are and Why We Care",
*Notices of the American Mathematical Society*,**60**(1): 50-65, doi:10.1090/noti936

This article uses material from the Wikipedia page available here. It is released under the Creative Commons Attribution-Share-Alike License 3.0.

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