N. A. Shirokov, “Means of the power $-2$ of derivatives in the class $S$”, Algebra i Analiz, 28:6 (2016), 189–207; St. Petersburg Math. J., 28:6 (2017), 855

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Algebra i Analiz, 2016, Volume 28, Issue 6, Pages 189–207 (Mi aa1518)

This article is cited in 2 scientific papers (total in 2 papers)

Research Papers

Means of the power $-2$ of derivatives in the class $S$

N. A. Shirokov^ab

^a St. Petersburg State University, Department of Mathematics and Mechanics, St. Petersburg, Russia
^b National Research University "Higher School of Economics", St. Petersburg, Russia

Full-text PDF (250 kB) Citations (2)

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Abstract: Let $S$ be the standard class of conformal mapping of the unit disk $\mathbb D$, and let $F\in \mathbb D$. Suppose that there exist Jordan domains $G_1$ and $G$, $G_1\supset G$, such that $G\subset \mathbb C\setminus f(\mathbb D)$, $\partial f(\mathbb D)\cap \partial G$ contains a Dini-smoth arc $\gamma$, and $G_1 \cap \partial f(\mathbb D) \cap \partial G=\gamma$. It is established that, in this case, for any $r$ with $0<r<1$, $F$ does not maximize the expression
$$\int _{|z|=r}\frac {1}{|F’(z)|^2} |dz| $$
in the class $S$.

Keywords: Brennan's conjecture, conformal mappings, means of the derivative of a conformal mapping, the class $S$.

Received: 07.06.2016

English version:
St. Petersburg Mathematical Journal, 2017, Volume 28, Issue 6, Pages 855–867
DOI: https://doi.org/10.1090/spmj/1477

Bibliographic databases:

Document Type: Article

Language: Russian

Citation: N. A. Shirokov, “Means of the power $-2$ of derivatives in the class $S$”, Algebra i Analiz, 28:6 (2016), 189–207; St. Petersburg Math. J., 28:6 (2017), 855–867

Citation in format AMSBIB

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\pages 189--207

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\jour St. Petersburg Math. J.

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\pages 855--867

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https://www.mathnet.ru/eng/aa/v28/i6/p189

This publication is cited in the following 2 articles:

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

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Abstract page:	271
Full-text PDF :	46
References:	50
First page:	23

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