[[1] K. Ben Ali, A. Ghanmi, K. Kefi, On the Steklov problem involving the p(x)-Laplacian with indefinite weight, Opuscula Math., 37(6), 2017, 779–794.10.7494/OpMath.2017.37.6.779]Search in Google Scholar
[[2] S. Baraket, S. Chebbi, N. Chorfi, V. Rădulescu, Non-autonomous eigenvalue problems with variable (p1, p2)-growth, Advanced Nonlinear Studies, 17(4), 2017, 781-792.10.1515/ans-2016-6020]Search in Google Scholar
[[3] P. Baroni, M. Colombo, G. Mingione, Non-autonomous functionals, borderline cases and related function classes, St. Petersburg Mathematical Journal, 27, 2016, 347-379.10.1090/spmj/1392]Search in Google Scholar
[[4] M. Cavalcanti, V. Domingos Cavalcanti, I. Lasiecka, C. Webler, Intrinsic decay rates for the energy of a nonlinear viscoelastic equation modeling the vibrations of thin rods with variable density, Adv. Nonlinear Anal., 6(2), 2017, 121-145.10.1515/anona-2016-0027]Search in Google Scholar
[[5] M. Cencelj, D. Repovš, Ž. Virk, Multiple perturbations of a singular eigenvalue problem, Nonlinear Anal., 119, 2015, 37-45.10.1016/j.na.2014.07.015]Search in Google Scholar
[[6] M. Colombo, G. Mingione, Bounded minimisers of double phase variational integrals, Archive for Rational Mechanics and Analysis, 218, 2015, 219-273.10.1007/s00205-015-0859-9]Search in Google Scholar
[[7] M. Colombo, G. Mingione, Calderón-Zygmund estimates and non-uniformly elliptic operators, Journal of Functional Analysis, 270, 2016, 1416-1478.10.1016/j.jfa.2015.06.022]Search in Google Scholar
[[8] L. Diening, P. Hästö, P. Harjulehto, M. Ružička, Lebesgue and Sobolev Spaces with Variable Exponents, Springer Lecture Notes, vol. 2017, Springer-Verlag, Berlin 2011.10.1007/978-3-642-18363-8]Search in Google Scholar
[[9] X. L. Fan, Remarks on eigenvalue problems involving the p(x)-Laplacian, J. Math. Anal. Appl., 352, 2009, 85-98.10.1016/j.jmaa.2008.05.086]Search in Google Scholar
[[10] Y. Fu, Y. Shan, On the removability of isolated singular points for elliptic equations involving variable exponent, Adv. Nonlinear Anal., 5(2), 2016, 121-132.10.1515/anona-2015-0055]Search in Google Scholar
[[11] K. Kefi, V. Rădulescu, On a p(x)-biharmonic problem with singular weights, Z. Angew. Math. Phys., 68(4), 2017, Art. 80, 13 pp.10.1007/s00033-017-0827-3]Search in Google Scholar
[[12] I. H. Kim, Y. H. Kim, Mountain pass type solutions and positivity of the infimum eigenvalue for quasilinear elliptic equations with variable exponents, Manuscripta Math., 147, 2015, 169-191.10.1007/s00229-014-0718-2]Search in Google Scholar
[[13] P. Marcellini, On the definition and the lower semicontinuity of certain quasiconvex integrals, Ann. Inst. H. Poincaré, Anal. Non Linéaire, 3, 1986, 391-409.10.1016/s0294-1449(16)30379-1]Search in Google Scholar
[[14] P. Marcellini, Regularity and existence of solutions of elliptic equations with (p, q)-growth conditions, J. Differential Equations, 90, 1991, 1-30.10.1016/0022-0396(91)90158-6]Search in Google Scholar
[[15] M. Mihăilescu, V. Rădulescu, Concentration phenomena in nonlinear eigenvalue problems with variable exponents and sign-changing potential, Journal d’Analyse Mathmatique, 111, 2010, 267-287.10.1007/s11854-010-0018-z]Search in Google Scholar
[[16] M. Mihăilescu, V. Rădulescu, D. Repovš, On a non-homogeneous eigenvalue problem involving a potential: an Orlicz-Sobolev space setting, J. Math. Pures Appl. (Journal de Liouville), 93, 2010, 132-148.10.1016/j.matpur.2009.06.004]Search in Google Scholar
[[17] J. Musielak, Orlicz Spaces and Modular Spaces, Lecture Notes in Mathematics, 1034, Springer-Verlag, Berlin, 1983.10.1007/BFb0072210]Search in Google Scholar
[[18] V. Rădulescu, Nonlinear elliptic equations with variable exponent: old and new, Nonlinear Analysis: Theory, Methods and Applications, 121, 2015, 336-369.10.1016/j.na.2014.11.007]Search in Google Scholar
[[19] V. Rădulescu, D. Repovš, Partial Differential Equations with Variable Exponents: Variational Methods and Qualitative Analysis, CRC Press, Taylor & Francis Group, Boca Raton FL, 2015.]Search in Google Scholar
[[20] D. Repovš, Stationary waves of Schrödinger-type equations with variable exponent, Anal. Appl. (Singap.), 13, 2015, 645-661.10.1142/S0219530514500420]Search in Google Scholar
[[21] I. Stăncuţ, I. Stîrcu, Eigenvalue problems for anisotropic equations involving a potential on Orlicz-Sobolev type spaces, Opuscula Math., 36(1), 2016, 81-101.10.7494/OpMath.2016.36.1.81]Search in Google Scholar