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Applicable Analysis
An International Journal
Volume 103, 2024 - Issue 8
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Research Article

Approximation by Haar polynomials in variable exponent grand Lebesgue spaces

S. S. VolosivetsSaratov State University, Saratov, Russian FederationCorrespondence[email protected]
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Pages 1447-1458 | Received 22 Apr 2023, Accepted 11 Aug 2023, Published online: 29 Aug 2023

References

  • Ková c˘ik O, Rákosník J. On spaces Lp(x) and Wk,p(x). Czechoslovak Math J. 1991;41(4):592–618. doi:10.21136/CMJ
  • Cruz-Uribe D, Fiorenza A. Variable Lebesgue spaces: foundations and harmonic analysis. Heidelberg: Birkhäuser/Springer; 2013.
  • Diening L, Harjulehto P, Hästö P, et al. Lebesgue and Sobolev spaces with variable exponents. Vol. 2017, Lecture notes in math. Heidelberg: Springer; 2011.
  • Sharapudinov II. Some problems of theory of approximation in the Lebesgue spaces with variable exponent. Vladikavkaz (Russia): South Mathematical Institute of Valdikavkaz Science Center RAN; 2012. (in Russian).
  • Kokilashvili VM, Meskhi A. Maximal and Calderón–Zygmund operators in grand variable exponent Lebesgue spaces. Georgian Math J. 2014;21(4):447–461. doi:10.1515/gmj-2014-0047
  • Iwaniec T, Sbordone C. On integrability of the Jacobian under minimal hypotheses. Arch Ration Mech Anal. 1992;119(2):129–143. doi:10.1007/BF00375119
  • Greco L, Iwaniec T, Sbordone C. Inverting the p-harmonic operator. Manuscr Math. 1997;92(1):249–258. doi:10.1007/BF02678192
  • Kashin BS, Saakyan AA. Orthogonal series. Translations of mathematical monograph. Vol. 75. Providence (RI): Amer. Math. Soc.; 1989.
  • Golubov BI, Efimov AV, Skvortsov VA. Walsh series and transforms. Dordrecht: Kluwer; 1991.
  • Sharapudinov II. Approximation of functions in variable-exponent Lebesgue and Sobolev spaces by finite Fourier–Haar series. Sb Math. 2014;205(2):291–306. doi:10.1070/SM2014v205n02ABEH004376
  • Volosivets SS. Approximation of polynomials in the Haar system in weighted symmetric spaces. Math Notes. 2016;99(5–6):643–651. doi:10.1134/S0001434616050035
  • Danelia N, Kokilashvili V. Approximation by trigonometric polynomials in the framework of variable exponent grand Lebesgue spaces. Georgian Math J. 2016;23(1):43–53. doi:10.1515/gmj-2015-0059
  • Israfilov DM, Testici A. Approximation in weighted generalized grand Lebesgue spaces. Colloq Math. 2016;143(1):113–126.
  • Bary NK, Stechkin SB. Best approximations and differential properties of two conjugate functions. Trudy Moskov Mat Obsch. 1956;5:483–522. (in Russian).
  • Testici A, Israfilov DM. Approximation by matrix transforms in generalized grand Lebesgue spaces with variable exponent. Appl Anal. 2021;100(4):819–834. doi:10.1080/00036811.2019.1622680
  • Israfilov DM, Guven A. Approximation by trigonometric polynomials in weighted Orlicz spaces. Studia Math. 2006;174(2):147–168. doi:10.4064/sm174-2-3
  • Volosivets SS, Tyuleneva AA. Approximation of functions and their conjugates in Lp and uniform metric by Euler means. Demonstr Math. 2018;51(1):141–150. doi:10.1515/dema-2018-0013

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