https://orcid.org/0000-0001-9979-8216
References
- Andrews G, Ball JM. Asymptotic behavior and changes in phase in one dimensional nonlinear viscoelasticity.J Differ Equ. 1982;44:306–341.
- Cavalcanti MM, Domingos Cavalcanti VN, Ferreira J. Existence and uniform decay for nonlinear viscoelastic equation with strong damping. Math Meth Appl Sci. 2001;24:1043–1053.
- Chen Y, Levine S, Rao M. Variable exponent, linear growth functionals in image restoration. SIAM J. Appl. Math.. 2006;66:1383–1406.
- Dafermos CM. Asymptotic stability in viscoelasticity. Arch Ration Mech Anal. 1970;37:297–308.
- Dafermos CM. On abstract volterra equations with applications to linear viscoelasticity. J Differ Equ Anal. 1970;7:554–569.
- Berrimi S, Messaoudi SA. Existence and decay of solutions of a viscoelastic equation with a nonlinear source. Nonlinear Anal. 2006;64:2314–2331.
- Berrimi S, Messaoudi SA. Exponential decay of solutions to a viscoelastic equation with nonlinear localized damping. Electron J Differ Equ. 2004;88:1–10.
- Cavalcanti MM, Domingos Cavalcanti VN, Soriano JA. Exponential decay for the solution of semilinear viscoelastic wave equation with localized damping. Electron J Differ Equ. 2002;44:1–14.
- Cavalcanti MM, Oquendo HP. Frictional versus viscoelastic damping in a semilinear wave equation. SIAM J Control Optim. 2003;42(4):1310–1324.
- Messaoudi SA. Blow up and global existence in nonlinear viscoelastic wave equations. Math Nachrich. 2003;260:58–66.
- Messaoudi SA. Blow up of solutions with positive initial energy in a nonlinear viscoelastic wave equations. J Math Anal Appl. 2006;320:902–915.
- Messaoudi SA, Tatar N-E. Global existence asymptotic behavior for a nonlinear viscoelastic problem. Math Methods Sci Res J. 2003;7(4):136–149.
- Song H, Zhong C. Blow-up of solutions of a nonlinear viscoelastic wave equation. Nonlinear Anal RWA. 2010;11:3877–3883.
- Song H, Xue D. Blow up in a nonlinear viscoelastic wave equation with strong damping. Nonlinear Anal. 2014;109:245–251.
- Wang YJ. A global nonexistence theorem for viscoelastic equations with arbitrarily positive initial energy. Appl Math Lett. 2009;22:1394–1400.
- Messaoudi SA. General decay of solutions of a viscoelastic equation. J Math Anal Appl. 2008;341:1457–1467.
- Messaoudi SA. General decay of the solution energy in a viscoelastic equation with a nonlinear source. Nonlinear Anal. 2008;69:2589–2598.
- Payne L, Sattinger D. Saddle points and instability on nonlinear hyperbolic equations. Israel Math J. 1975;22:273–303.
- Sattinger DH. Stability of nonlinear hyperbolic equations. Arch Rational Mech Anal. 1968;28:226–244.
- Pinasco JP. Blow-up for parabolic and hyperbolic problems with variable exponents. Nonlinear Anal. 2009;71:1094–1099.
- Antontsev S. Wave equation with p(x,t)-Laplacian and damping term: blow-up of solutions. C R Mec. 2011;339(12):751–755.
- Guo B, Gao W. Blow-up of solutions to quasilinear hyperbolic equations with p(x,t)-Laplacian and positive initial energy. C R Mecanique. 2014;342:513–519.
- Gao Y, Gao W. Existence of weak solutions for viscoelastic hyperbolic equations with variable exponents. Bound Value Probl. 2013;2013(1):1–8.
- Park SH, Kang JR. Blow-up of solutions for a viscoelastic wave equation with variable exponents. Math Methods Appl Sci. 2019;42(6):2083–2097.
- Diening L, Harjulehto P, Hästö P, et al. Lebesgue and Sobolev spaces with variable exponents. Heidelberg: Springer-Verlag; 2011. (Lecture Notes in Mathematics 2017).
- Edmunds DE, Rákosník J. Sobolev embeddings with variable exponent. Studia Math. 2000;143:267–293.
- Edmunds DE, Rákosník J. Sobolev embeddings with variable exponent. Math. Nachr. 2002;246/247:53–67.
- Musielak J. Orlicz spaces and modular spaces. Berlin: Springer-Verlag; 1983. (Lecture Notes in Mathematics,Vol. 1034).
- Georgiev V, Todorova G. Existence of solutions of the wave equation with nonlinear damping and source terms. J Differ Equ. 1994;109:295–308.