Exponential function: Difference between revisions

Exponential function or exp, can be defined as solution of differential equation

${\displaystyle \exp ^{\prime }(z)=\exp(z)}$

with the additional condition

${\displaystyle \exp(0)=1}$

The study of the exponential function began with Leonhard Euler around 1730^[1] Since that time, it has had widely applications in technology and science; in particular, exponential growth is described with such functions.

Properties

The exponential is an entire function.

For any complex ${\displaystyle p}$ and ${\displaystyle q}$, the basic property holds:

${\displaystyle \exp(a)~\exp(b)=\exp(a+b)}$

The definition allows to calculate all the derivatives at zero; so, the Taylor expansion has the form

${\displaystyle \exp(z)=\sum _{n=0}^{\infty }{\frac {z^{n}}{n!}}~~\forall z\in \mathbb {C} }$

where ${\displaystyle \mathbb {C} }$ means the set of complex numbers. The series converges for any complex ${\displaystyle z}$. In particular, the series converges for any real value of the argument.

${\displaystyle \exp(z)=\lim _{n\rightarrow \infty }\left(1+{\frac {z}{n}}\right)^{n}~\forall z\in \mathbb {C} }$

Inverse function

The inverse function of the exponential is the logarithm; for any complex ${\displaystyle z\neq 0}$, the relation holds:

${\displaystyle \exp(\log(z))=z~\forall z\in \mathbb {C} }$

Exponential also can be considered as inverse of logarithm, while the imaginary part of the argument is smaller than ${\displaystyle \pi }$:

${\displaystyle \log(\exp(z))=z~\forall z\in \mathbb {C} ~\mathrm {~such~that~} |\Im (z)|<\pi }$

When the logarithm has a cut along the negative part of the real axis, exp can be considered.

Number e

${\displaystyle \mathrm {e} =\exp(1)}$ is widely used in applications; this notation is commonly accepted. Its approximate value is

Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle {\rm e}=\exp(1) \approx 2.71828 18284 59045 23536}

Periodicity and relation with sin and cos functions

Exponential is periodic function; the period is ${\displaystyle 2\pi \mathrm {i} }$:

${\displaystyle \exp(z+2\pi \mathrm {i} )=\exp(z)~\forall z\in \mathbb {C} }$

The exponential is related to the trigonometric functions sine and cosine by de Moivre's formula:

${\displaystyle \exp(\mathrm {i} z)=\cos(z)+\mathrm {i} \sin(z)~\forall z\in \mathbb {C} }$

Generalization of exponential

${\displaystyle \exp ^{c}(z)}$ in the complex ${\displaystyle z}$ plane for some real values of ${\displaystyle c}$.

${\displaystyle \exp ^{c}(x)}$ versus ${\displaystyle x}$ for some real values of ${\displaystyle c}$.

The notation ${\displaystyle \exp _{b}}$ is used for the exponential with scaled argument;

${\displaystyle \exp _{b}(z)=b^{z}=\exp \!{\Big (}\log(b)~z{\Big )}}$

Notation ${\displaystyle \exp _{b}^{c}}$ is used for the iterated exponential:

${\displaystyle \exp _{b}^{0}(z)=z}$

${\displaystyle \exp _{b}^{1}(z)=\exp _{b}(z)}$

${\displaystyle \exp _{b}^{2}(z)=\exp _{b}\!{\Big (}\exp _{b}(z){\Big )}}$

${\displaystyle \exp _{b}^{c+1}(z)=\exp _{b}\!{\Big (}\exp _{b}^{c}(z){\Big )}}$

For non-integer values of ${\displaystyle c}$, the iterated exponential can be defined as

${\displaystyle \exp _{b}^{c}(z)=\mathrm {sexp} _{b}\!{\Big (}c+{\mathrm {sexp} _{b}}^{-1}(z){\Big )}}$

where ${\displaystyle \mathrm {sexp} _{b}(z)}$ is function ${\displaystyle F}$ satisfying conditions

${\displaystyle F(z+1)=\exp _{b}\!{\Big (}F(z){\Big )}}$

${\displaystyle F(0)=1}$

${\displaystyle F(z)~\mathrm {~is~holomorphic~and~bounded~at} ~|\Re (z)|<1}$

The inverse function is defined with condition

${\displaystyle F{\Big (}F^{-1}(z){\Big )}=z}$

and, within some range of values of ${\displaystyle z}$

${\displaystyle F^{-1}{\Big (}F(z){\Big )}=z}$

If in the notation ${\displaystyle \exp _{b}^{c}}$ the superscript is omitted, it is assumed to be unity; for example ${\displaystyle \exp _{b}^{1}=\exp _{b}}$. If the suberscript is omitted, it is assumed to be ${\displaystyle \mathrm {e} }$, id est, ${\displaystyle \exp ^{c}=\exp _{\mathrm {e} }^{c}}$

At non-integer values of ${\displaystyle c}$, the fixed points of logarithm ${\displaystyle L\approx 0.31813150520476413\pm 1.3372357014306895~\mathrm {i} }$ are branch points of function ${\displaystyle \exp ^{c}}$; in figure, the cut is placed parallel to the real axis. At ${\displaystyle c<0}$ there is an additional cut which goes along the negative part of the real axis. In the figure, these cuts are marked with pink.

References

• Ahlfors, Lars V. (1953). Complex analysis. McGraw-Hill Book Company, Inc..
• H.Kneser. ``Reelle analytische Losungen der Gleichung ${\displaystyle \varphi (\varphi (x))=\mathrm {e} ^{x}}$ und verwandter Funktionalgleichungen. Journal fur die reine und angewandte Mathematik, 187 (1950), 56-67.