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Applicable Analysis
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Volume 103, 2024 - Issue 8
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Research Article

Multiplicity of solutions for a non-local problem with indefinite weights

K. Kefia Department of Computer Sciences, Faculty of Computer Science and Information Technology, Northern Border University, Arar, Saudi Arabia;b Faculty of Sciences, University of Tunis El-Manar, Tunis, TunisiaCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0001-9277-5820
ORCID Icon,
C. Nefzic Mathematics Department, Faculty of Sciences, University of Tunis El-Manar, Tunis, Tunisia
,
A. Alshammaria Department of Computer Sciences, Faculty of Computer Science and Information Technology, Northern Border University, Arar, Saudi Arabia
&
M. M. Al-Shomranid Department of Mathematics, Faculty of Science, King Abdulaziz University, Jeddah, Kingdom of Saudi Arabia
Pages 1387-1396 | Published online: 09 Aug 2023

References

  • Kefi K, Rădulescu VD. On a p(x)-biharmonic problem with singular weights. Z Angew Math Phys. 2017;68(80):13.
  • Kefi K, Irzi N, AL-Shomrani M. Existence of three weak solutions for fourthorder Leray-Lions problem with indefinite weights, complex. Var Elliptic Equ. doi:10.1080/17476933.2022.2056887
  • Kefi K, Irzi N, Mosa Al-Shomrani M, et al. On the fourth-order Leray-Lions problem with indefinite weight and nonstandard growth conditions. Bull. Math. Sci. doi:10.1142/S1664360721500089
  • Kefi K, Repovs DD, Saoudi K. On weak solutions for fourth-order problems involving the Leray-Lions type operators. Math Meth Appl Sci. 2021;44:13060–13068. doi:10.1002/mma.7606
  • Kong L. On a fourth order elliptic problem with a p(x)-biharmonic operator. App Math Lett. 2014;27:21–25. doi:10.1016/j.aml.2013.08.007
  • Heidarkhani S, Afrouzi GA, Moradi S, et al. Existence of one weak solution for p(x)-biharmonic equations with Navier boundary conditions. Z Angew Math Phys. 2016;67:73. doi:10.1007/s00033-016-0668-5
  • Heidarkhani S, Afrouzi GA, Moradi S, et al. A variational approach for solving p(x)biharmonic equations with Navier boundary conditions. Electron J Differ Equat. 2017;25:1–15.
  • Liao F-F, Heidarkhani S, Moradi S. Multiple solutions for nonlocal elliptic problems driven by p(x)-biharmonic operator. AIMS Math; 6(4):4156–4172. doi:10.3934/math.2021246
  • Zhikov VV. Lavrentiev phenomenon and homogenization for some variational problems. C R Acad Sci Paris Sér I Math. 1993;316(5):435–439.
  • Chen Y, Levine S. M. variable exponent, linear growth functionals in image processing. SIAM J Appl Math. 2006;66:1383–1406. doi:10.1137/050624522
  • Rajagopal K, Ružička M. Mathematical modelling of electrorheological fluids, Contin. Mech Thermodyn. 2001;13:59–78. doi:10.1007/s001610100034
  • Antontsev SN, Shmarev SI. A model porous medium equation with variable exponent of nonlinearity: existence, uniqueness and localization properties of solutions. Nonlin Anal. 2005;60:515–545. doi:10.1016/j.na.2004.09.026
  • Heidarkhani S, Moradi S, Avci M. Critical points approaches to a nonlocal elliptic problem driven by p(x)-biharmonic operator. Georgian Math. J. doi:10.1515/gmj-2021-2115
  • Miao Q. Multiple solutions for nonlocal elliptic systems involving p(x)-Biharmonic operator. Mathematics. 2019;7(8):756), doi:10.3390/math7080756
  • Fan X, Zhao D. On the spaces Lp(x)(Ω) and Wm,p(x)(Ω). J Math Anal Appl. 2001;263:424–446. doi:10.1006/jmaa.2000.7617
  • Rădulescu VD. Nonlinear elliptic equations with variable exponent: old and new. Nonlinear Anal. 2015;121:336–369. doi:10.1016/j.na.2014.11.007
  • Rădulescu VD, Repovš DD. Partial differential equations with variable exponents: variational methods and qualitative analysis. Boca Raton (FL): Chapman and Hall /CRC, Taylor & Francis Group; 2015.
  • Edmunds D, Rakosnik J. Sobolev embeddings with variable exponent. Studia Math. 2000;143:267–293. doi:10.4064/sm-143-3-267-293
  • Kefi K. P(x)-Laplacian with indefinite weight. Proc Amer Math Soc. 2011;139:4351–4360. doi:10.1090/S0002-9939-2011-10850-5
  • Bonanno G, Marano SA. On the structure of the critical set of nondifferentiable functions with a weak compactness condition. Appl Anal. 2010;89:1–10. doi:10.1080/00036810903397438
  • Benali K, Kefi K, Ouerghi H. Existence and multiplicity of solutions for α(x)-Kirchhoff equation with indefinite weights, to appear in. Adv Pure Appl Math.

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