Some Refinements and Generalizations of Bohr’s Inequality

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Autores principales:	Aljawi, Salma, Conde, Cristian Marcelo, Feki, Kais
Formato:	Artículo publishedVersion
Lenguaje:	Inglés
Publicado:	Multidisciplinary Digital Publishing Institute 2026
Materias:	Bohr’s inequality Bergström’s inequality Radon’s inequality Matemáticas Matemática Pura
Acceso en línea:	http://repositorio.ungs.edu.ar:8080/xmlui/handle/UNGS/2713
Aporte de:	Repositorio Institucional Digital de Acceso Abierto (UNGS) de Universidad Nacional de General Sarmiento

id	I71-R177-UNGS-2713
record_format	dspace
spelling	I71-R177-UNGS-27132026-01-15T09:49:47Z Some Refinements and Generalizations of Bohr’s Inequality Aljawi, Salma Conde, Cristian Marcelo Feki, Kais Bohr’s inequality Bergström’s inequality Radon’s inequality Matemáticas Matemática Pura Revista con referato Fil: Conde, Cristian Marcelo. Consejo Nacional de Investigaciones Científicas y Técnicas; Argentina. Fil: Conde, Cristian Marcelo. Universidad Nacional de General Sarmiento. Instituto de Ciencias; Argentina. Fil: Aljawi, Salma. Princess Nourah bint Abdulrahman University; Arabia Saudita. Fil: Feki, Kais. Najran University; Arabia Saudita. En este artículo, profundizamos en la clásica desigualdad de Bohr para números complejos, un resultado fundamental en el análisis complejo con amplias aplicaciones matemáticas. Ofrecemos refinamientos y generalizaciones de la desigualdad de Bohr, ampliando las desigualdades establecidas de N. G. de Bruijn y Radon, y aprovechando la clase de funciones definidas por la desigualdad de Daykin-Eliezer-Carlitz. Nuestra novedosa contribución reside en demostrar que las desigualdades de Bohr y Bergström pueden derivarse entre sí, revelando una interconexión más profunda entre estos resultados. Además, presentamos varias generalizaciones nuevas de la desigualdad de Bohr, junto con otras desigualdades notables de la literatura, y analizamos sus diversas implicaciones. Al proporcionar condiciones más completas y verificables, nuestro trabajo amplía la investigación previa y mejora la comprensión y la aplicabilidad de la desigualdad de Bohr en los estudios matemáticos. In this article, we delve into the classic Bohr inequality for complex numbers, a fundamentalresult in complex analysis with broad mathematical applications. We offer refinements and generalizations of Bohr’s inequality, expanding on the established inequalities of N. G. de Bruijn and Radon, as well as leveraging the class of functions defined by the Daykin–Eliezer–Carlitz inequality. Our novel contribution lies in demonstrating that Bohr’s and Bergström’s inequalities can be derived from one another, revealing a deeper interconnectedness between these results. Furthermore, we present several new generalizations of Bohr’s inequality, along with other notable inequalities from theliterature, and discuss their various implications. By providing more comprehensive and verifiableconditions, our work extends previous research and enhances the understanding and applicability ofBohr’s inequality in mathematical studies. Neste artigo, aprofundamos a desigualdade clássica de Bohr para números complexos, um resultado fundamental em análise complexa com amplas aplicações matemáticas. Oferecemos refinamentos e generalizações da desigualdade de Bohr, expandindo as desigualdades já estabelecidas por N. G. de Bruijn e Radon, bem como aproveitando a classe de funções definida pela desigualdade de Daykin-Eliezer-Carlitz. Nossa contribuição inédita reside em demonstrar que as desigualdades de Bohr e Bergström podem ser derivadas uma da outra, revelando uma interconexão mais profunda entre esses resultados. Além disso, apresentamos diversas novas generalizações da desigualdade de Bohr, juntamente com outras desigualdades notáveis ??da literatura, e discutimos suas várias implicações. Ao fornecer condições mais abrangentes e verificáveis, nosso trabalho amplia pesquisas anteriores e aprimora a compreensão e a aplicabilidade da desigualdade de Bohr em estudos matemáticos. 2026-01-15T09:49:47Z 2026-01-15T09:49:47Z 2024 info:eu-repo/semantics/article info:ar-repo/semantics/artículo info:eu-repo/semantics/publishedVersion Aljawi, S., Conde, C. M. y Feki, K. (2024). Some Refinements and Generalizations of Bohr’s Inequality. Axioms, 13(7), 1-12. 2075-1680 http://repositorio.ungs.edu.ar:8080/xmlui/handle/UNGS/2713 eng http://dx.doi.org/10.3390/axioms13070436 info:eu-repo/semantics/openAccess https://creativecommons.org/licenses/by-nc-nd/4.0/ application/pdf application/pdf Multidisciplinary Digital Publishing Institute Axioms. Jun. 2024; 13(7): 1-12 https://www.mdpi.com/2075-1680/13/7
institution	Universidad Nacional de General Sarmiento
institution_str	I-71
repository_str	R-177
collection	Repositorio Institucional Digital de Acceso Abierto (UNGS)
language	Inglés
orig_language_str_mv	eng
topic	Bohr’s inequality Bergström’s inequality Radon’s inequality Matemáticas Matemática Pura
spellingShingle	Bohr’s inequality Bergström’s inequality Radon’s inequality Matemáticas Matemática Pura Aljawi, Salma Conde, Cristian Marcelo Feki, Kais Some Refinements and Generalizations of Bohr’s Inequality
topic_facet	Bohr’s inequality Bergström’s inequality Radon’s inequality Matemáticas Matemática Pura
description	Revista con referato
format	Artículo Artículo publishedVersion
author	Aljawi, Salma Conde, Cristian Marcelo Feki, Kais
author_facet	Aljawi, Salma Conde, Cristian Marcelo Feki, Kais
author_sort	Aljawi, Salma
title	Some Refinements and Generalizations of Bohr’s Inequality
title_short	Some Refinements and Generalizations of Bohr’s Inequality
title_full	Some Refinements and Generalizations of Bohr’s Inequality
title_fullStr	Some Refinements and Generalizations of Bohr’s Inequality
title_full_unstemmed	Some Refinements and Generalizations of Bohr’s Inequality
title_sort	some refinements and generalizations of bohr’s inequality
publisher	Multidisciplinary Digital Publishing Institute
publishDate	2026
url	http://repositorio.ungs.edu.ar:8080/xmlui/handle/UNGS/2713
work_keys_str_mv	AT aljawisalma somerefinementsandgeneralizationsofbohrsinequality AT condecristianmarcelo somerefinementsandgeneralizationsofbohrsinequality AT fekikais somerefinementsandgeneralizationsofbohrsinequality
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Some Refinements and Generalizations of Bohr’s Inequality

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