References
- Cavalcanti MM, Domingos Cavalcanti VN, Ferreira J. Existence and uniform decay for nonlinear viscoelastic equation with strong damping. Math Methods Appl Sci. 2001;24:1043–1053. doi: 10.1002/mma.250
- Messaoudi SA, Tatar N-E. Global existence asymptotic behavior for a non-linear viscoelastic problem. Math Methods Sci Res. 2003;7(4):136–149.
- Messaoudi SA, Tatar N-E. Global existence and uniform stability of solutions for a quasilinear viscoelastic problem. Math Methods Appl Sci. 2007;30:665–680. doi: 10.1002/mma.804
- Messaoudi SA, Tatar N-E. Exponential and polynomial decay for a quasilinear viscoelastic equation. Nonlinear Anal TMA. 2008;68:785–793. doi: 10.1016/j.na.2006.11.036
- Han X, Wang M. General decay of energy for a viscoelastic equation with nonlinear damping. Math Methods Appl Sci. 2009;32(3):346–358. doi: 10.1002/mma.1041
- Messaoudi SA. General decay of solution energy in a viscoelastic equation with a nonlinear source. Nonlinear Anal. 2008;69:2589–2598. doi: 10.1016/j.na.2007.08.035
- Messaoudi SA. General decay of solutions of a viscoelastic equation. J Math Anal App. 2008;341:1457–1467. doi: 10.1016/j.jmaa.2007.11.048
- Liu W. General decay and blow up of solution for a quasilinear viscoelastic equation with a nonlinear source. Nonlinear Anal. 2010;73:1890–1904. doi: 10.1016/j.na.2010.05.023
- Liu W. General decay rate estimate for a viscoelastic equation with weakly nonlinear time-dependent dissipation and source terms. J Math Phys. 2009;50(11):113506. doi: 10.1063/1.3254323
- Messaoudi SA, Mustafa M. A general stability result for a quasilinear wave equation with memory. Nonlin Anal. 2013;14:1854–1864. doi: 10.1016/j.nonrwa.2012.12.002
- Cavalcanti MM, Domingos Cavalcanti V, Lasiecka I, et al. Intrinsic decay rates for the energy of a nonlinear viscoelastic equation modeling the vibrations of thin rods with variable density. Adv Nonlinear Anal. 2016; Available from: doi: 10.1515/anona-2016-0027.
- Messaoudi SA, Al-Khulaifi W. General and optimal decay for a quasilinear viscoelastic equation. Appl Math Lett. 2017;66:16–22. doi: 10.1016/j.aml.2016.11.002
- Lagnese J. Asymptotic energy estimates for Kirchhoff plates subject to weak viscoelastic damping. (International Series of Numerical Mathematics; vol. 91). Bassel: Birhauser, Verlag; 1989.
- Muñoz Rivera J, Lapa EC, Barreto R. Decay rates for viscoelastic paltes with memory. J Elast. 1996;44:61–87. doi: 10.1007/BF00042192
- Komornik V. On the nonlinear boundary stabilization of Kirchoff Plates. NoDEA. 1994;1:323–337. doi: 10.1007/BF01194984
- Messaoudi SA. Global existence and nonexistence in a system of Petrovsky. J Math Anal Appl. 2002;265(2):296–308. doi: 10.1006/jmaa.2001.7697
- Chen W, Zhou Y. Global nonexistence for a semilinear Petrovsky equation. Nonlinear Anal A. 2009;70(9):3203–3208. doi: 10.1016/j.na.2008.04.024
- Santos M, Junior F. A boundary condition with memory for Kirchoff plates equations. Appl Math Comput. 2004;148:475–496.
- Benaissa A, Guesmia A. Energy decay of solutions of a wave equation of φ-Laplacian type with a general weakly nolinear dissipation. Elec J Diff Equ. 2008;109:1–22.
- Guesmia A. Existence globale et stabilisation interne non linéaire d'un système de Petrovsky. Bull Belg Math Soc. 1998;5:583–594.
- Han X, Wang M. General decay estimate of energy for the second order evolution equations with memory. Act Appl Math. 2010;110:194–207.
- Lagnese J. Boundary stabilization of thin plates. Philadelphia: SIAM; 1989.
- Lasiecka I. Exponential decay rates for the solutions of Euler-Bernoulli equations with boundary dissipation occurring in the moments only. J Differ Equ. 1992;95:169–182. doi: 10.1016/0022-0396(92)90048-R
- Barrow JD, Parsons P. Inflationary models with logarithmic potentials. Phys Rev D. 1995;52:5576–5587. doi: 10.1103/PhysRevD.52.5576
- Enqvist K, McDonald J. Q-balls and baryogenesis in the MSSM. Phys Lett B. 1998;425:309–321. doi: 10.1016/S0370-2693(98)00271-8
- Bartkowski K, Gorka P. One-dimensional Klein-Gordon equation with logarithmic nonlinearities. J Phys A. 2008;41(35):355201. doi: 10.1088/1751-8113/41/35/355201
- Bialynicki-Birula I, Mycielski J. Wave equations with logarithmic nonlinearities. Bull Acad Polon Sci Ser Sci Math Astronom Phys. 1975;23(4):461–466.
- Gorka P. Logarithmic Klein-Gordon equation. Acta Phys Polon B. 2009;40(1):59–66.
- Bialynicki-Birula I, Mycielski J. Nonlinear wave mechanics. Ann Phys. 1976;100(1–2):62–93. doi: 10.1016/0003-4916(76)90057-9
- Gorka P, Prado H, Reyes EG. Nonlinear equations with infinitely many derivatives. Complex Anal Oper Theory. 2011;5(1):313–323. doi: 10.1007/s11785-009-0043-z
- Vladimirov VS. The equation of the p-adic open string for the scalar tachyon field. Izv Math. 2005;69(3):487–512. doi: 10.1070/IM2005v069n03ABEH000536
- Cazenave T, Haraux A. Equations d'evolution avec non-linearite logarithmique. Ann Fac Sci Toulouse Math. 1980;2(1):21–51. doi: 10.5802/afst.543
- Hiramatsu T, Kawasaki M, Takahashi F. Numerical study of Q-ball formation in gravity mediation. J Cosmol Astropart Phys. 2010;2010(6):008. doi: 10.1088/1475-7516/2010/06/008
- Han X. Global existence of weak solutions for a logarithmic wave equation arising from Q-ball dynamics. Bull Korean Math Soc. 2013;50(1):275–283. doi: 10.4134/BKMS.2013.50.1.275
- Chen H, Luo P, Liu GW. Global solution and blow-up of a semilinear heat equation with logarithmic nonlinearity. J Math Anal Appl. 2015;422:84–98. doi: 10.1016/j.jmaa.2014.08.030
- Gross L. Logarithmic Sobolev inequalities. Amer J Math. 1975;97(4):1061–1083. doi: 10.2307/2373688
- Lions J. Quelques methods de resolution des probléms aux limites non lineaires. Paris: Dunod Gauthier-Villars; 1969.
- Cavalcanti MM, Oquendo HP. Frictional versus viscoelastic damping in a semilinear wave equation. SIAM J Control Optim. 2003;42(4):1310–1324. doi: 10.1137/S0363012902408010
- Lasiecka I, Tataru D. Uniform boundary stabilization of semilinear wave equation with nonlinear boundary damping. Differ Integral Equ. 1993;6(6):507–533.