A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω)

Yasin Kaya

doi:10.23884/mejs.2020.6.1.04

EN

A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω)

Abstract

In this study, at first we provide a general overview of L^p(x)(Ω) spaces, also known as variable exponent Lebesgue spaces. They are a generalization of classical Lebesgue spaces L^p in the sense that constant exponent replaced by a measurable function. Then, based on classical Lebesgue space approach we prove a reverse of Hölder inequality in L^p(x)(Ω). Therefore, our proof in variable exponent Lebesgue space is very similar to that in classical Lebesgue space.

Keywords

Variable exponent Lebesgue space,measure,Radon–Nikodym derivative

References

[1] Hudzik, H., “The problems of separability, duality, reflexivity and of comparison for generalized Orlicz–Sobolev spaces ”, Commentationes Mathematicae, 21, 315–324, 1979.
[2] Musielak, J., Orlicz spaces and modular spaces, Springer, Berlin Heidelberg New York, 1983.
[3] Orlicz, W., “Über konjugierte Exponentenfolgen”, Studia Mathematica, 3, 200–212, 1931.
[4] Růžička, M., Elektrorheological fluids: modeling and mathematical theory, Springer-Verlag, Berlin, 2000.
[5] Acerbi, E., Mingione, G., “Regularity results for stationary electro-rheological fluids”, Archive for Rational Mechanics and Analysis, 164(3), 213-259, 2002.
[6] Aboulaich, R., et al., “New diffusion models in image processing”, Computers & Mathematics with Applications, 56, 4, 874-882, 2008.
[7] Chen, Y., et al., “Variable exponent, linear growth functionals in image restoration” SIAM journal on Applied Mathematics, 66, 4, 1383-1406, 2006.
[8] Zhikov , V.V., “Meyer-type estimates for solving the nonlinear Stokes system”, Differential Equations, 33, 1, 108–115, 1997.

Details

Primary Language

English

Subjects

Mathematical Sciences

Journal Section

Research Article

Authors

Yasin Kaya ^*
0000-0002-7779-6903
Türkiye

Publication Date

June 29, 2020

Submission Date

November 18, 2019

Acceptance Date

June 18, 2020

Published in Issue

Year 2020 Volume: 6 Number: 1

DOI

https://doi.org/10.23884/mejs.2020.6.1.04

IZ

https://izlik.org/JA95TM37ML

Cite

RIS / Bibtex

APA

Kaya, Y. (2020). A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω). Middle East Journal of Science, 6(1), 32-36. https://doi.org/10.23884/mejs.2020.6.1.04

AMA

1.Kaya Y. A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω). MEJS. 2020;6(1):32-36. doi:10.23884/mejs.2020.6.1.04

Chicago

Kaya, Yasin. 2020. “A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω)”. Middle East Journal of Science 6 (1): 32-36. https://doi.org/10.23884/mejs.2020.6.1.04.

EndNote

Kaya Y (June 1, 2020) A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω). Middle East Journal of Science 6 1 32–36.

IEEE

[1]Y. Kaya, “A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω)”, MEJS, vol. 6, no. 1, pp. 32–36, June 2020, doi: 10.23884/mejs.2020.6.1.04.

ISNAD

Kaya, Yasin. “A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω)”. Middle East Journal of Science 6/1 (June 1, 2020): 32-36. https://doi.org/10.23884/mejs.2020.6.1.04.

JAMA

1.Kaya Y. A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω). MEJS. 2020;6:32–36.

MLA

Kaya, Yasin. “A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω)”. Middle East Journal of Science, vol. 6, no. 1, June 2020, pp. 32-36, doi:10.23884/mejs.2020.6.1.04.

Vancouver

1.Yasin Kaya. A REVERSE HÖLDER INEQUALITY IN L^p(x)(Ω). MEJS. 2020 Jun. 1;6(1):32-6. doi:10.23884/mejs.2020.6.1.04