THE INEQUALITIES OF HELDER AND MINKOVSKY AND THEIR GENERALIZATIONS
НЕРІВНОСТІ ГЕЛЬДЕРА ТА МІНКОВСЬКОГО ТА ЇХНІ УЗАГАЛЬНЕННЯ
DOI:
https://doi.org/10.31110/fmo2025.v40i4-03Keywords:
Hölder's inequality, Minkowski's inequality, vector, linear space, norm, integral, integral inequalityAbstract
Formulation of the Problem. A large amount of mathematical literature is devoted to classical inequalities. Helder's inequalities, a special case of which is the Cauchy-Buniakovsky inequality, as well as Minkowski's, which is a polygon inequality in a normed space, underlie the geometry of unitary and normed spaces - finite and infinite-dimensional (Banach). The article considers the generalization of these constructions - both in discrete form, that is, for finite sums and series, and for integrals. It is essential that inequalities for sums are proved by elementary methods, without the use of differential calculus. The results obtained can be used in scientific activities for evaluating some expressions in the form of sums or integrals, as well as by students in preparation for Olympiads and even for studying mathematics in school circles.
Materials and Methods. To prove the generalized Minkowski inequality and the integral inequalities of Helder and Minkowski, the generalized Helder inequality for sums, which was previously obtained by the author which, in turn, was derived from Cauchy's inequality.
Results. The generalized Minkowski inequalities were proved for finite sums and infinite series with non-negative members and the integral for non-negative functions, as well as the generalized integral Helder inequality and, in a special case, the Cauchy-Bunyakovsky inequality.
Conclusion. The application of the generalized Helder and Minkowski inequalities for sums, series, and integrals is a fairly effective method that allows you to obtain interesting consequences, important estimates – you only need to successfully select finite-dimensional or infinite-dimensional vectors or functions and apply the proved inequalities to them. On this path, there is a great deal of space for creative activity.
Downloads
References
Aldaz, J. M., Barza, S., Fujii, M., & Moslehian, M. S. (2015). Advances in Operator Cauchy—Schwarz inequalities and their reverses. Annals of Functional Analysis, 6(3), 275–295. https://doi.org/10.15352/afa/06-3-20
Bokhonov, Yu., & Bokhonova, T. (2023). Nerivnosti Koshi-Buniakovskoho i Heldera ta yikhnie uzahalnennia [The inequalities of Cauchy-Buniakovsky and Helder and their generalizations]. Fizyko-matematychna osvita – Physical and Mathematical Education, 38(2), 11-14. https://doi.org/10.31110/2413-1571-2023-038-2-002 (in Ukrainian).
Bokhonov, Yu.Ye. (2022). Uzahalʹnennya nerivnostey Koshi-Bunyakovsʹkoho ta Heldera [Generalization of the Cauchy-Buniakowski and Helder inequalities]. Science in the context of global transformation of society. Materials of the scientific and practical conference (Poltava, August 26-27, 2022), Odesa: "Young Scientist" Publishing House. (in Ukrainian).
Martynenko, O. V., & Chkana, Ya. O. (2017). Vykorystannia metodiv matematychnoho analizu dlia dovedennia nerivnostei [Using methods of mathematical analysis to prove inequalities]. Aktualni pytannia pryrodnycho-matematychnoi osvity – Current issues in natural science and mathematics education, 1(9), 35–44. http://elibrary.kdpu.edu.ua/bitstream/0564/1362/2/APPMO_N9_2017.pdf. (in Ukrainian).
Mitrinovic, D.S., & Pecaric, J.E. (1993). Springer Science+Bisiness Media Dordrecht, 83-99. URL: https://books.google.ru/books?id=A0XwCAAAQBAJ&pg=PA83&hl=ru&source=gbs_toc_r&cad=3#v=onepage&q&f=false
Steele, J.M. (2004). The Cauchy_Schwarz Master Class. Cambridge University Press.
Zhuravsʹka, H.V., & Shramenoko V.M. (2010). Nerivnosti: Metodychni vkazivky do kursiv liniinoi alhebry ta matematychnoho analizu [Inequalities: Methodological guidelines for courses in linear algebra and mathematical analysis]. Kyiv Polytechnic Institute. URL: https://mph.kpi.ua/assets/img/Shramenko-V.M/neravenstva1.pdf. (in Ukrainian).
Downloads
Published
Issue
Section
Categories
How to Cite
License
Copyright (c) 2025 Юрій Бохонов
This work is licensed under a Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License.
- Authors grant the journal a right of the first publication of the work under a Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License (CC BY-NC-SA 4.0)that allows others freely to use (read, copy and print) submissions, search content and link to published articles, disseminate their full text and use them for any legitimate non-commercial purposes (i.e. educational or scientific) with the mandatory reference to the article’s authors and initial publication in this journal.
- Original published articles cannot be used by users (exept authors) for commercial purposes or distributed by third-party intermediary organizations for a fee.
