Erratum to: Logarithmic coefficients and a coefficient conjecture for univalent functions

Erratum to: Logarithmic coefficients and a coefficient conjecture for univalent functions Monatsh Math (2018) 185:503–506 https://doi.org/10.1007/s00605-017-1051-0 ERRATUM Erratum to: Logarithmic coefficients and a coefficient conjecture for univalent functions 1 2 Milutin Obradovic´ · Saminathan Ponnusamy · Karl-Joachim Wirths Received: 7 April 2017 / Accepted: 11 April 2017 / Published online: 24 April 2017 © Springer-Verlag Wien 2017 Erratum to: Monatsh Math DOI 10.1007/s00605-017-1024-3 In the proof of Theorem 1 in [1], the present authors stated the expression for γ ( f ) n λ wherein in the second term of the expression in the bracket a factor n in denominator was missing, although it does not affect the statement of Theorem 1. As a result, it might be useful for the reader to know the remaining part of the proof as it is not obvious. The correct expression for γ ( f ) should be n λ n n 1 1 + λ λ γ ( f ) = + (−1) for n ≥ 1. n λ 2 n n(1 + λ) Communicated by A. Constantin. The online version of the original article can be found under doi:10.1007/s00605-017-1024-3. B Saminathan Ponnusamy samy@isichennai.res.in; samy@iitm.ac.in Milutin Obradovic´ obrad@grf.bg.ac.rs Karl-Joachim Wirths kjwirths@tu-bs.de Department of Mathematics, Faculty of Civil Engineering, University of Belgrade, Bulevar http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Monatshefte f�r Mathematik Springer Journals

Erratum to: Logarithmic coefficients and a coefficient conjecture for univalent functions

Loading next page...
 
/lp/springer_journal/erratum-to-logarithmic-coefficients-and-a-coefficient-conjecture-for-MHGiOd0RRB
Publisher
Springer Vienna
Copyright
Copyright © 2017 by Springer-Verlag Wien
Subject
Mathematics; Mathematics, general
ISSN
0026-9255
eISSN
1436-5081
D.O.I.
10.1007/s00605-017-1051-0
Publisher site
See Article on Publisher Site

Abstract

Monatsh Math (2018) 185:503–506 https://doi.org/10.1007/s00605-017-1051-0 ERRATUM Erratum to: Logarithmic coefficients and a coefficient conjecture for univalent functions 1 2 Milutin Obradovic´ · Saminathan Ponnusamy · Karl-Joachim Wirths Received: 7 April 2017 / Accepted: 11 April 2017 / Published online: 24 April 2017 © Springer-Verlag Wien 2017 Erratum to: Monatsh Math DOI 10.1007/s00605-017-1024-3 In the proof of Theorem 1 in [1], the present authors stated the expression for γ ( f ) n λ wherein in the second term of the expression in the bracket a factor n in denominator was missing, although it does not affect the statement of Theorem 1. As a result, it might be useful for the reader to know the remaining part of the proof as it is not obvious. The correct expression for γ ( f ) should be n λ n n 1 1 + λ λ γ ( f ) = + (−1) for n ≥ 1. n λ 2 n n(1 + λ) Communicated by A. Constantin. The online version of the original article can be found under doi:10.1007/s00605-017-1024-3. B Saminathan Ponnusamy samy@isichennai.res.in; samy@iitm.ac.in Milutin Obradovic´ obrad@grf.bg.ac.rs Karl-Joachim Wirths kjwirths@tu-bs.de Department of Mathematics, Faculty of Civil Engineering, University of Belgrade, Bulevar

Journal

Monatshefte f�r MathematikSpringer Journals

Published: Apr 24, 2017

There are no references for this article.

You’re reading a free preview. Subscribe to read the entire article.


DeepDyve is your
personal research library

It’s your single place to instantly
discover and read the research
that matters to you.

Enjoy affordable access to
over 12 million articles from more than
10,000 peer-reviewed journals.

All for just $49/month

Explore the DeepDyve Library

Unlimited reading

Read as many articles as you need. Full articles with original layout, charts and figures. Read online, from anywhere.

Stay up to date

Keep up with your field with Personalized Recommendations and Follow Journals to get automatic updates.

Organize your research

It’s easy to organize your research with our built-in tools.

Your journals are on DeepDyve

Read from thousands of the leading scholarly journals from SpringerNature, Elsevier, Wiley-Blackwell, Oxford University Press and more.

All the latest content is available, no embargo periods.

See the journals in your area

DeepDyve Freelancer

DeepDyve Pro

Price
FREE
$49/month

$360/year
Save searches from Google Scholar, PubMed
Create lists to organize your research
Export lists, citations
Read DeepDyve articles
Abstract access only
Unlimited access to over
18 million full-text articles
Print
20 pages/month
PDF Discount
20% off