In mathematics, a **holomorphic function** is a complex-valued function of one or more complex variables that is, at every point of its sub domain (), complex differentiable in a neighborhood of the point. The existence of a complex derivative in a neighbourhood is a very strong condition, for it implies that any holomorphic function is actually infinitely differentiable and equal, locally, to its own Taylor series (*analytic*). Holomorphic functions are the central objects of study in complex analysis.

Though the term *analytic function* is often used interchangeably with "holomorphic function", the word "analytic" is defined in a broader sense to denote any function (real, complex, or of more general type) that can be written as a convergent power series in a neighbourhood of each point in its domain. The fact that all holomorphic functions are complex analytic functions, and vice versa, is a major theorem in complex analysis.^{[1]}

Holomorphic functions are also sometimes referred to as *regular functions*.^{[2]}^{[3]} A holomorphic function whose domain is the whole complex plane is called an entire function. The phrase "holomorphic at a point *z*_{0}" means not just differentiable at *z*_{0}, but differentiable everywhere within some neighbourhood of *z*_{0} in the complex plane.

## Definition

Given a complex-valued function *f* of a single complex variable, the **derivative** of *f* at a point *z*_{0} in its domain is defined by the limit^{[4]}

This is the same as the definition of the derivative for real functions, except that all of the quantities are complex. In particular, the limit is taken as the complex number *z* approaches *z*_{0}, and must have the same value for any sequence of complex values for *z* that approach *z*_{0} on the complex plane. If the limit exists, we say that *f* is **complex-differentiable** at the point *z*_{0}. This concept of complex differentiability shares several properties with real differentiability: it is linear and obeys the product rule, quotient rule, and chain rule.^{[5]}

If *f* is *complex differentiable* at *every* point *z*_{0} in an open set *U*, we say that *f* is **holomorphic on U**. We say that

*f*is

**holomorphic at the point**if

*z*_{0}*f*is complex differentiable on some neighbourhood of

*z*

_{0}.

^{[6]}We say that

*f*is holomorphic on some non-open set

*A*if it is holomorphic in an open set containing

*A*. As a pathological non-example, the function given by

*f*(

*z*) = |

*z*|

^{2}is complex differentiable at exactly one point (

*z*

_{0}= 0), and for this reason, it is

*not*holomorphic at 0 because there is no open set around 0 on which

*f*is complex differentiable.

The relationship between real differentiability and complex differentiability is the following. If a complex function *f*(*x* + i *y*) = *u*(*x*, *y*) + i *v*(*x*, *y*) is holomorphic, then *u* and *v* have first partial derivatives with respect to *x* and *y*, and satisfy the Cauchy–Riemann equations:^{[7]}

or, equivalently, the Wirtinger derivative of *f* with respect to the complex conjugate of *z* is zero:^{[8]}

which is to say that, roughly, *f* is functionally independent from the complex conjugate of *z*.

If continuity is not given, the converse is not necessarily true. A simple converse is that if *u* and *v* have *continuous* first partial derivatives and satisfy the Cauchy–Riemann equations, then *f* is holomorphic. A more satisfying converse, which is much harder to prove, is the Looman–Menchoff theorem: if *f* is continuous, *u* and *v* have first partial derivatives (but not necessarily continuous), and they satisfy the Cauchy–Riemann equations, then *f* is holomorphic.^{[9]}

## Terminology

The word "holomorphic" was introduced by two of Cauchy's students, Briot (1817–1882) and Bouquet (1819–1895), and derives from the Greek ὅλος (*holos*) meaning "entire", and μορφή (*morphē*) meaning "form" or "appearance".^{[10]}

Today, the term "holomorphic function" is sometimes preferred to "analytic function". An important result in complex analysis is that every holomorphic function is complex analytic, a fact that does not follow obviously from the definitions. The term "analytic" is however also in wide use.

## Properties

Because complex differentiation is linear and obeys the product, quotient, and chain rules, the sums, products and compositions of holomorphic functions are holomorphic, and the quotient of two holomorphic functions is holomorphic wherever the denominator is not zero.^{[11]}

If one identifies **C** with **R**^{2}, then the holomorphic functions coincide with those functions of two real variables with continuous first derivatives which solve the Cauchy–Riemann equations, a set of two partial differential equations.^{[7]}

Every holomorphic function can be separated into its real and imaginary parts, and each of these is a solution of Laplace's equation on **R**^{2}. In other words, if we express a holomorphic function *f*(*z*) as *u*(*x*, *y*) + *i v*(*x*, *y*) both *u* and *v* are harmonic functions, where v is the harmonic conjugate of u.^{[12]}

Cauchy's integral theorem implies that the contour integral of every holomorphic function along a loop vanishes:^{[13]}

Here *γ* is a rectifiable path in a simply connected open subset *U* of the complex plane **C** whose start point is equal to its end point, and *f* : *U* → **C** is a holomorphic function.

Cauchy's integral formula states that every function holomorphic inside a disk is completely determined by its values on the disk's boundary.^{[13]} Furthermore: Suppose *U* is an open subset of **C**, *f* : *U* → **C** is a holomorphic function and the closed disk *D* = {*z* : |*z* − *z*_{0}| ≤ *r*} is completely contained in *U*. Let γ be the circle forming the boundary of *D*. Then for every *a* in the interior of *D*:

where the contour integral is taken counter-clockwise.

The derivative *f*′(*a*) can be written as a contour integral^{[13]} using **Cauchy's differentiation formula**:

for any simple loop positively winding once around *a*, and

for infinitesimal positive loops γ around *a*.

In regions where the first derivative is not zero, holomorphic functions are conformal in the sense that they preserve angles and the shape (but not size) of small figures.^{[14]}

Every holomorphic function is analytic. That is, a holomorphic function *f* has derivatives of every order at each point *a* in its domain, and it coincides with its own Taylor series at *a* in a neighbourhood of *a*. In fact, *f* coincides with its Taylor series at *a* in any disk centred at that point and lying within the domain of the function.

From an algebraic point of view, the set of holomorphic functions on an open set is a commutative ring and a complex vector space. Additionally, the set of holomorphic functions in an open set U is an integral domain if and only if the open set U is connected. ^{[8]} In fact, it is a locally convex topological vector space, with the seminorms being the suprema on compact subsets.

From a geometric perspective, a function *f* is holomorphic at *z*_{0} if and only if its exterior derivative *df* in a neighbourhood *U* of *z*_{0} is equal to *f*′(*z*) *dz* for some continuous function *f*′. It follows from

that *df*′ is also proportional to *dz*, implying that the derivative *f*′ is itself holomorphic and thus that *f* is infinitely differentiable. Similarly, the fact that *d*(*f dz*) = *f*′ *dz* ∧ *dz* = 0 implies that any function *f* that is holomorphic on the simply connected region *U* is also integrable on *U*. (For a path γ from *z*_{0} to *z* lying entirely in *U*, define

- ;

in light of the Jordan curve theorem and the generalized Stokes' theorem, *F*_{γ}(*z*) is independent of the particular choice of path γ, and thus *F*(*z*) is a well-defined function on *U* having *F*(*z*_{0}) = *F*_{0} and *dF* = *f dz*.)

## Examples

All polynomial functions in *z* with complex coefficients are holomorphic on **C**, and so are sine, cosine and the exponential function. (The trigonometric functions are in fact closely related to and can be defined via the exponential function using Euler's formula). The principal branch of the complex logarithm function is holomorphic on the set **C** ∖ {*z* ∈ **R** : z ≤ 0}. The square root function can be defined as

and is therefore holomorphic wherever the logarithm log(*z*) is. The function 1/*z* is holomorphic on {*z* : *z* ≠ 0}.

As a consequence of the Cauchy–Riemann equations, a real-valued holomorphic function must be constant. Therefore, the absolute value of *z*, the argument of *z*, the real part of *z* and the imaginary part of *z* are not holomorphic. Another typical example of a continuous function which is not holomorphic is the complex conjugate *z* formed by complex conjugation.

## Several variables

The definition of a holomorphic function generalizes to several complex variables in a straightforward way. Let *D* denote an open subset of **C**^{n}, and let *f* : *D* → **C**. The function *f* is **analytic** at a point *p* in *D* if there exists an open neighbourhood of *p* in which *f* is equal to a convergent power series in *n* complex variables.^{[15]} Define *f* to be **holomorphic** if it is analytic at each point in its domain. Osgood's lemma shows (using the multivariate Cauchy integral formula) that, for a continuous function *f*, this is equivalent to *f* being holomorphic in each variable separately (meaning that if any *n* − 1 coordinates are fixed, then the restriction of *f* is a holomorphic function of the remaining coordinate). The much deeper Hartogs' theorem proves that the continuity hypothesis is unnecessary: *f* is holomorphic if and only if it is holomorphic in each variable separately.

More generally, a function of several complex variables that is square integrable over every compact subset of its domain is analytic if and only if it satisfies the Cauchy–Riemann equations in the sense of distributions.

Functions of several complex variables are in some basic ways more complicated than functions of a single complex variable. For example, the region of convergence of a power series is not necessarily an open ball; these regions are Reinhardt domains, the simplest example of which is a polydisk. However, they also come with some fundamental restrictions. Unlike functions of a single complex variable, the possible domains on which there are holomorphic functions that cannot be extended to larger domains are highly limited. Such a set is called a domain of holomorphy.

A complex differential (*p*,0)-form α is holomorphic if and only if its antiholomorphic Dolbeault derivative is zero, .

## Extension to functional analysis

The concept of a holomorphic function can be extended to the infinite-dimensional spaces of functional analysis. For instance, the Fréchet or Gateaux derivative can be used to define a notion of a holomorphic function on a Banach space over the field of complex numbers.

## See also

- Antiderivative (complex analysis)
- Antiholomorphic function
- Biholomorphy
- Holomorphic separability
- Meromorphic function
- Quadrature domains
- Harmonic maps
- Harmonic morphisms
- Wirtinger derivatives

## References

**^***Analytic functions of one complex variable*, Encyclopedia of Mathematics. (European Mathematical Society ft. Springer, 2015)**^**"Analytic function",*Encyclopedia of Mathematics*, EMS Press, 2001 [1994], retrieved February 26, 2021**^**Adam Getchel. "Regular Function".*MathWorld*. Retrieved February 26, 2021.**^**Ahlfors, L.,*Complex Analysis, 3 ed.*(McGraw-Hill, 1979).**^**Henrici, P.,*Applied and Computational Complex Analysis*(Wiley). [Three volumes: 1974, 1977, 1986.]**^**Peter Ebenfelt, Norbert Hungerbühler, Joseph J. Kohn, Ngaiming Mok, Emil J. Straube (2011)*Complex Analysis*Springer Science & Business Media- ^
^{a}^{b}Markushevich, A.I.,*Theory of Functions of a Complex Variable*(Prentice-Hall, 1965). [Three volumes.] - ^
^{a}^{b}Gunning, Robert C.; Rossi, Hugo (1965),*Analytic Functions of Several Complex Variables*, Prentice-Hall series in Modern Analysis, Englewood Cliffs, N.J.: Prentice-Hall, pp. xiv+317, ISBN 9780821869536, MR 0180696, Zbl 0141.08601 **^**Gray, J. D.; Morris, S. A. (1978), "When is a Function that Satisfies the Cauchy-Riemann Equations Analytic?",*The American Mathematical Monthly*(published April 1978),**85**(4): 246–256, doi:10.2307/2321164, JSTOR 2321164.**^**Markushevich, A. I. (2005) [1977]. Silverman, Richard A. (ed.).*Theory of functions of a Complex Variable*(2nd ed.). New York: American Mathematical Society. p. 112. ISBN 0-8218-3780-X.**^**Henrici, Peter (1993) [1986],*Applied and Computational Complex Analysis Volume 3*, Wiley Classics Library (Reprint ed.), New York - Chichester - Brisbane - Toronto - Singapore: John Wiley & Sons, pp. X+637, ISBN 0-471-58986-1, MR 0822470, Zbl 1107.30300.**^**Evans, Lawrence C. (1998),*Partial Differential Equations*, American Mathematical Society.- ^
^{a}^{b}^{c}Lang, Serge (2003),*Complex Analysis*, Springer Verlag GTM, Springer Verlag **^**Rudin, Walter (1987),*Real and complex analysis*(3rd ed.), New York: McGraw–Hill Book Co., ISBN 978-0-07-054234-1, MR 0924157**^**Gunning and Rossi,*Analytic Functions of Several Complex Variables*, p. 2.

## Further reading

## External links

- "Analytic function",
*Encyclopedia of Mathematics*, EMS Press, 2001 [1994]