http://orcid.org/0000-0003-4071-5097
References
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- Zhikov VV . Averaging of functionals of the calculus of variations and elasticity theory. Math USSR-Izv. 1987;29(1):33–66. (translated from Izv Akad Nauk SSSR Ser Mat. 1986;50(4):675--710. Russian).
- Zhikov VV . The Lavrent’ev effect and averaging of nonlinear variational problems. Differ Equ. 1991;27(1):32–39. (translated from Differ Uravn. 1991;27(1):42--50. Russian).
- Zhikov VV . On passage to the limit in nonlinear variational problems. Russian Acad Sci Sb Math. 1993;76(2):427–459. (translated from Mat Sb. 1992;183(8):47--84. Russian).
- Zhikov V . On Lavrentiev’s phenomenon. Russ J Math Phys. 1995;3:249–269.
- Diening L . Maximal functions on generalized Lebesgue spaces Lp(.) . Math Inequal Appl. 2004;7(2):245–253.
- Cruz-Uribe D , Diening L , Fiorenza A . A new proof of the boundedness of maximal operators on variable Lebesgue spaces. Boll Unione Mat Ital (9). 2009;2(1):151–173.
- Diening L . Riesz potential and Sobolev embeddings on generalized Lebesgue and Sobolev spaces Lp(.) and Wk,p(.) . Math Nachr. 2004;268:31–43.
- Zhikov VV . Meyer-type estimates for solving the nonlinear Stokes system. Differ Equ. 1997;33(1):108–115. (translated from Differ Uravn. 1997;33(1):107--114. Russian).
- Alkhutov YuA . The Harnack inequality and the Hölder property of solutions of nonlinear elliptic equations with a nonstandard growth condition. Differ Equ. 1997;33(12):1653–1663. (translated from Differ Uravn. 1997;33(12):1651--1660. Russian).
- Fan XL , Zhao D . A class of De Giorgi type and Hölder continuity. Nonlinear Anal. 1999;6:295–318.
- Rüžička M . Electrorheological fluids: modeling and mathematical theory. Berlin: Springer-Verlag; 2000.
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- Alkhutov YuA . Hölder continuity of p(x)-harmonic functions. Sb Math. 2005;196(2):147–171. (translated from Mat Sb. 2005;196(2):3--28. Russian).
- Fan X , Zhao D . Regularity of quasi-minimizers of integral functionals with discontinuous p(x)-growth conditions. Nonlinear Anal. 2006;65:1521–1531.
- Fan X , Wang S , Zhao D . Density of C(Ω) in W1,p(x) with discontinuous exponent p(x) . Math Nachr. 2006;279(1–2):142–149.
- Alkhutov YuA , Surnachev MD . On a Harnack inequality for the elliptic (p,q)-Laplacian. Dokl Math. 2016;94(2):569–573. (translated from Doklady Akademii Nauk. 2016;470(6):651--655. Russian).
- Moser J . On Harnack’s theorem for elliptic differential equations. Comm Pure Appl Math. 1961;14:577–591.
- Alkhutov YuA , Zhikov VV . On the Hölder continuity of solutions to degenerate elliptic equations. Dokl Math. 2001;63(3):368–373. (translated from Doklady Akademii Nauk. 2001; 378(5): 583--588. Russian).
- Alkhutov YuA , Zhikov VV . A class of degenerate elliptic equations. J Math Sci. 2004;120(3):1247–1254. (translated from Trudy Seminara imemi I.G. Petrovskogo. 2003;23:16--27. Russian).
- Gilbarg D , Trudinger NS . Elliptic partial differential equations of second order. Reprint of the 1998 ed. Berlin: Springer; 2001.
- Serrin J . Local behavior of solutions of quasi-linear equations. Acta Math. 1964;111:247–302.
- Alkhutov YuA , Krasheninnikova OV . Continuity at boundary points of solutions of quasilinear elliptic equations with a non-standard growth condition. Izv Math. 2004;68(6):1063–1117. (translated from Izv RAN Ser Mat. 2004;68(6):3--60. Russian).
- Maz’ya VG . On the continuity at a boundary point of the solution of quasi-linear elliptic equations. Vestn Leningr Gos Univ. 1970;25(13):42–55. Russian.