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Difference between revisions of "Simply-periodic function"

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(Category:Functions of a complex variable)
 
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''simple periodic function''
 
''simple periodic function''
  
A [[Periodic function|periodic function]] $f(z)$ of the complex variable $z$ all periods $p$ of which are integer multiples of a single unique fundamental, or primitive, period $2\omega\neq0$, i.e. $p=2n\omega$ ($n\in\mathbf Z$). For example, the [[Exponential function|exponential function]] $e^z$ is an entire simply-periodic function with fundamental period $2\omega=2\pi i$, and the [[Trigonometric functions|trigonometric functions]] $\tan z$ and $\operatorname{cotan}z$ are meromorphic simply-periodic functions with fundamental period $2\omega=\pi$.
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A [[periodic function]] $f(z)$ of the complex variable $z$ all periods $p$ of which are integer multiples of a single unique fundamental, or primitive, period $2\omega\neq0$, i.e. $p=2n\omega$ ($n\in\mathbf Z$). For example, the [[exponential function]] $e^z$ is an entire simply-periodic function with fundamental period $2\omega=2\pi i$, and the [[trigonometric functions]] $\tan z$ and $\operatorname{cotan}z$ are meromorphic simply-periodic functions with fundamental period $2\omega=\pi$.
  
  
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====Comments====
 
====Comments====
 
More generally, a simply-periodic function on a linear space $X$ is a periodic function whose periods are integer multiples of some basic period $2\omega\in X$. A non-constant continuous periodic function of a real variable is necessarily simply-periodic.
 
More generally, a simply-periodic function on a linear space $X$ is a periodic function whose periods are integer multiples of some basic period $2\omega\in X$. A non-constant continuous periodic function of a real variable is necessarily simply-periodic.
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See also [[Double-periodic function]]
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[[Category:Functions of a complex variable]]

Latest revision as of 18:55, 17 October 2014

simple periodic function

A periodic function $f(z)$ of the complex variable $z$ all periods $p$ of which are integer multiples of a single unique fundamental, or primitive, period $2\omega\neq0$, i.e. $p=2n\omega$ ($n\in\mathbf Z$). For example, the exponential function $e^z$ is an entire simply-periodic function with fundamental period $2\omega=2\pi i$, and the trigonometric functions $\tan z$ and $\operatorname{cotan}z$ are meromorphic simply-periodic functions with fundamental period $2\omega=\pi$.


Comments

More generally, a simply-periodic function on a linear space $X$ is a periodic function whose periods are integer multiples of some basic period $2\omega\in X$. A non-constant continuous periodic function of a real variable is necessarily simply-periodic.

See also Double-periodic function

How to Cite This Entry:
Simply-periodic function. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Simply-periodic_function&oldid=31936
This article was adapted from an original article by E.D. Solomentsev (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article
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