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Difference between revisions of "Analytic image"

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An extension of the concept of a [[Complete analytic function|complete analytic function]], obtained on considering all possible elements of an analytic function in the form of generalized power series (Puiseux series)
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An extension of the concept of a [[complete analytic function]], obtained on considering all possible elements of an analytic function in the form of generalized power series ([[Puiseux series]])
 
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Here $z$ is a complex variable, $m$ is an integer and $n$ is a natural number. The series converge in the domains $|z-z_0| < r$ and $|z| > r > 0$, respectively. An analytic image can be identified with the class of all elements of the form \eqref{*} which are obtained from each other by [[Analytic continuation|analytic continuation]]. The analytic image differs from the complete analytic function by the addition of all ramified elements of the form \eqref{*} with $n>1$, which are obtained by analytic continuation of its regular elements with $n=1$. After the introduction of a suitable topology, the analytic image is converted to the [[Riemann surface|Riemann surface]] of the given function.
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Here $z$ is a complex variable, $m$ is an integer and $n$ is a natural number. The series converge in the domains $|z-z_0| < r$ and $|z| > r > 0$, respectively. An analytic image can be identified with the class of all elements of the form \eqref{*} which are obtained from each other by [[analytic continuation]]. The analytic image differs from the complete analytic function by the addition of all ramified elements of the form \eqref{*} with $n>1$, which are obtained by analytic continuation of its regular elements with $n=1$. After the introduction of a suitable topology, the analytic image is converted to the [[Riemann surface]] of the given function.
  
 
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[[Category:Functions of a complex variable]]

Latest revision as of 17:44, 1 November 2014

An extension of the concept of a complete analytic function, obtained on considering all possible elements of an analytic function in the form of generalized power series (Puiseux series) $$ \begin{equation}\label{*} \sum_{\nu=m}^\infty a_\nu (z-z_0)^{\nu/n}\ , \ \ \ \sum_{\nu=m}^\infty a_\nu z^{-\nu/n} \end{equation} $$ Here $z$ is a complex variable, $m$ is an integer and $n$ is a natural number. The series converge in the domains $|z-z_0| < r$ and $|z| > r > 0$, respectively. An analytic image can be identified with the class of all elements of the form \eqref{*} which are obtained from each other by analytic continuation. The analytic image differs from the complete analytic function by the addition of all ramified elements of the form \eqref{*} with $n>1$, which are obtained by analytic continuation of its regular elements with $n=1$. After the introduction of a suitable topology, the analytic image is converted to the Riemann surface of the given function.

References

[1] A.I. Markushevich, "Theory of functions of a complex variable" , 3 , Chelsea (1977) pp. Chapt. 8 (Translated from Russian)
How to Cite This Entry:
Analytic image. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Analytic_image&oldid=34150
This article was adapted from an original article by E.D. Solomentsev (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article