References
- Acerbi E, Mingione G. Regularity results for a class of functionals with non-standard growth. Arch Ration Mech Anal. 2001;156:121–140.
- Antontsev S, Rodrigues J. On stationary thermo-rheological viscous flows. Ann dell'Universita di Ferrara. 2006;52:19–36.
- Arrieta JM, Ferraresso F, Lambeti PD. Boundary homogenization for a triharmonic intermediate problem. Math Methods Appl Sci. 2018;41(3):979–985.
- Gala S, Ragusa MA. Improved regularity criterion for the 3D Navier-Stokes equations via the gradient of one velocity component. Partial Differ Equ Appl. 2021;2(3):Article ID 42.
- Ragusa MA. Parabolic Herz spaces and their applications. Appl Math Lett. 2012;25(10):1270–1273.
- Rika M. Electrorheological fluids: modeling and mathematical theory. Berlin: Springer-Verlag; 2000.
- Sin C. The existence of strong solutions to steady motion of electrorheological fluids in 3D cubic domain. Appl Math Anal Appl. 2017;445(1):1025–1046.
- Winslow WM. Induced fibration of suspensions. J Appl Phys. 1949;20:1137–1140.
- Zhan H. The nonlinear diffusion equation of the ideal barotropic gas through a porous medium. Open Math. 2017;15:895–906.
- Candito P, Molica Bisci G. Multiple solutions for a Navier boundary value problem involving the p-biharmonic operator. Discrete Contin Dyn Syst Ser S. 2012;5:741–751.
- Gu H, An T. Infinitely many solutions for a class of fourth-order partially sublinear elliptic problem. Bound Value Probl. 2017;2017(1):1–8.
- Lan Y. Existence of solutions to a class of Navier boundary value problem involving the polyharmonic. Adv Pure Math. 2018;8:373–379.
- Miao Q. Multiple solutions for nonlinear Navier boundary systems involving (p1(x), …, pn(x))-biharmonic problem. Discrete Dyn Nat Soc. 2016;2016:Article ID 3050417, 10 pages.
- Rahal B. Existence results of infinitely many solutions for p(x)-Kirchhoff type triharmonic operator with Navier boundary conditions. J Math Anal Appl. 2019;478:1133–1146.
- Yin H, Liu Y. Existence of three solutions for a Navier boundary value problem involving the p(x)-biharmonic. Bull Korean Math Soc. 2013;50(6):1817–1826.
- Bonanno G, Candito P. Infinitely many solutions for a class of discrete non-linear boundary value problems. Appl Anal. 2009;88(4):605–616.
- Bonanno G, Molica Bisci G. Infinitely many solutions for a boundary value problem with discontinuous nonlinearities. Bound Value Probl. 2009;2009:1–20.
- Graef JR, Heidarkhani S, Kong L. Infinitely many periodic solutions to a class of perturbed second-order impulsive Hamiltonian systems. Differ Equ Appl. 2017;9(2):195–212.
- Shokooh S. Three solutions for a nonlinear equation involving p-triharmonic operators. J Nonlinear Funct Anal. 2021;2021:Article ID 9.
- Ricceri B. A general variational principle and some of its applications. J Comput Appl Math. 2000;133:401–410.
- Drábek P, Milota J. Methods of nonlinear analysis: application to differential equations. Berlin: Birkhäuser; 2006.