References
- Lê A. Eigenvalue problems for the p-Laplacian. Nonlinear Anal. 2006;64:1057–1099.
- Ghergu M, Rádulescu V. Singular elliptic problems, bifurcation and asymptotic analysis. Oxford University Press; Oxford 2008. (Oxford lecture series in mathematics and its applications).
- O'Regan D. Some general existence principles and results for (ϕ(y′))′=qf(t,y,y′), 0<t<1. SIAM J Math Anal. 1993;24:648–668.
- Choi QH, Jung T. A nonlinear suspension bridge equation with nonconstant load. Nonlinear Anal TMA. 1999;35:649–668.
- Choi QH, Jung T. Multiplicity results for the nonlinear suspension bridge equation. Dyn Cont Discrete Impuls Syst Ser A: Math Anal. 2002;9:29–38.
- Choi QH, Jung T, McKenna PJ. The study of a nonlinear suspension bridge equation by a variational reduction method. Appl Anal. 1993;50:73–92.
- McKenna PJ, Walter W. Nonlinear oscillations in a suspension bridge. Arch Rat Mech Anal. 1987;98:167–177.
- Choi QH, Jung T. An application of a variational reduction method to a nonlinear wave equation. J Differ Equ. 1995;117:390–410.
- Guan X, Liu W, Zhou Q, et al. Some lump solutions for a generalized (3+1)-dimensional Kadomtsev–Petviashvili equation. Appl Math Comput. 2020;366:124757.
- Guan X, Zhou Q, Liu W. Lump and lump strip solutions to the (3+1)-dimensional generalized Kadomtsev–Petviashvili equation. Eur Phys J Plus. 2019;134(7):371.
- Liu W, Zhang Y, Wazwaz AM, et al. Analytic study on triple-s, triple-triangle structure interactions for solitons in inhomogeneous multi-mode fiber. Appl Math Comput. 2019;361:325–331.
- Yang CF, Liu DQ. Half-inverse problem for the Dirac operator. Appl Math Lett. 2019;87:172–178.
- Manásevich R, Mawhin J. Periodic solutions for nonlinear systems with p-Laplacian-like operators. J Differ Equ. 1998;145:367–393.
- Manásevich R, Mawhin J. Boundary value problems for nonlinear perturbations of vector p-Laplacian-like operators. J Korean Math Soc. 2000;37:665–685.
- del Pino M, Elgueta M, Manasevich R. A homotopic deformation along p of a Leray Schauder degree result and existence for (|u′|p−2u′)′+f(x,u)=0, u(0)=u(T)=0, p>1. J Differ Equ. 1898;80:1–13.
- Kim Y-H, Wang L, Zhang C. Global bifurcation for a class of degenerate elliptic equations with variable exponents. J Math Anal Appl. 2010;371:624–637.