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image/svg+xml Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Closed Access logo, derived from PLoS Open Access logo. This version with transparent background. http://commons.wikimedia.org/wiki/File:Closed_Access_logo_transparent.svg Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Journal d Analyse Ma...arrow_drop_down
image/svg+xml Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Closed Access logo, derived from PLoS Open Access logo. This version with transparent background. http://commons.wikimedia.org/wiki/File:Closed_Access_logo_transparent.svg Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao
Journal d Analyse Mathématique
Article . 1994 . Peer-reviewed
License: Springer TDM
Data sources: Crossref
image/svg+xml Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Closed Access logo, derived from PLoS Open Access logo. This version with transparent background. http://commons.wikimedia.org/wiki/File:Closed_Access_logo_transparent.svg Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao
zbMATH Open
Article . 1994
Data sources: zbMATH Open
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Holomorphic functions on rotation invariant families of curves passing through the origin

Authors: Globevnik, Josip;

Holomorphic functions on rotation invariant families of curves passing through the origin

Abstract

Let \(\Delta\) denote the unit disc in \(\mathbb{C}\) with boundary \(b\Delta\) and let \(\Gamma\subset \mathbb{C}\) be a smooth Jordan curve which is symmetric with respect to the real axis. Let \(D\) denote the bounded domain bounded by \(\Gamma\) and let \(\Omega= \bigcup_{s\in b\Delta} s\Gamma\) be the union of all sets obtained by rotating \(\Gamma\) about the origin. Let \(f\in C(\Omega)\) and assume that for each \(s\in b\Delta\), (1) \(f_{| s\Gamma}\) has a continuous extension to \(s\overline D\) which is holomorphic on \(sD\). In previous paper the author has proved that if \(0\in \mathbb{C}\backslash \overline D\) then (1) impies that \(f\) is holomorphic on \(\text{Int}(\Omega)\) [Trans. Am. Math. Soc. 280, 247-254 (1983; Zbl 0575.30033)], whereas if \(0\in D\), then in general (1) does not imply that \(f\) is holomorphic on \(\text{Int}(\Omega)\) [Trans. Am. Math. Soc. 306, No. 1, 401-410 (1988; Zbl 0639.30031)]. In the present paper the author considers the critical case when \(0\in b\Delta\). In this case \(\Omega\) is a disc centered at the origin. The main result of the paper is as follows: Theorem 1. Suppose in addition to the above, \(\Gamma\) passes through the origin and is of class \(C^ 2\) in a neighborhood of the origin. Let \(f\in C(\Omega)\) satisfy (1) and assume that \(f\) is infinitely smooth at the origin. Then \(f\) is holomorphic on \(\text{Int}(\Omega)\). In Section 2 of the paper the author considers this set in greater detail when \(\Gamma\) is a circle passing through the origin and shows that it is closely related to the set of continuous functions satisfying the Morera condition along circles passing through the origin, whose characterization is obtained in Section 3.

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Series expansions of functions of one complex variable

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selected citations
These citations are derived from selected sources.
This is an alternative to the "Influence" indicator, which also reflects the overall/total impact of an article in the research community at large, based on the underlying citation network (diachronically).
BIP!Citations provided by BIP!
popularity
This indicator reflects the "current" impact/attention (the "hype") of an article in the research community at large, based on the underlying citation network.
BIP!Popularity provided by BIP!
influence
This indicator reflects the overall/total impact of an article in the research community at large, based on the underlying citation network (diachronically).
BIP!Influence provided by BIP!
impulse
This indicator reflects the initial momentum of an article directly after its publication, based on the underlying citation network.
BIP!Impulse provided by BIP!
4
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