Asymptotic Regularity and Exponential Attractors for Nonclassical Diusion Equations With Critical Exponent
Abstract
In this paper, we consider the dynamical behavior of the nonclassical diffusion equation when nonlinearity is critical for both two cases: the forcing term belongs to H −1 (Ω) and L2 (Ω). For the case the forcing term only belongs to H −1 (Ω), based on the asymptotic regularity in Dynamical Systems: An International Journal, 26 (4), (2011), 391–400, we prove the existence of exponential attractors in weak topological space H 1 (Ω). For the case the forcing term belongs to L2 (Ω), we prove the asymptotic regularity of the solutions and exponential attractors.
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[1] Aifantis, E. C. (1980). On the problem of di_usion in solids. Acta Mech., 37, 265-296.
[2] Lions, J. L., & Magenes, E. (1972). Non-homogeneous boundary value problems and applications.
Spring-verlag: Berlin.
[3] Kuttler, K., & Aifantis, E. C. (1987). Existence and uniqueness in nonclassical diffusion. Quart. Appl.
Math., 45, 549-560.
[4] Kuttler, K., & Aifantis, E. C. (1988). Quasilinear evolution equations in nonclassical diffusion. SIAM J.
Math. Anal., 19, 110-120.
[5] Aifantis, E. C. (2011). Gradient nanomechanics: Applications to deformation, fracture, and diffusion in
nanopolycrystals. Metall. Mater. Trans., A42, 2985-2998.
[6] Kalantarov, V. K. (1986). On the attractors for some non-linear problems of mathematical physics. Zap.
Nauch. Sem. LOMI, 152, 50-54.
[7] Xiao, Y. L. (2002). Attractors for a nonclassical di_usion equation. Acta Math. Appl. Sinica., 18,
273-276.
[8] Sun, C. Y., Wang, S. Y., & Zhong, C. K. (2007). Global attractors for a nonclassical di_usion equation.
Acta Math. Sinica, English Series., 23, 1271-1280.
[9] Ma, Q. Z., & Zhong, C. K. (2004). Global attractors of strong solutions to nonclassical diffusion
equations. Journal of Lanzhou University, 40, 7-9.
[10] Wang, S. Y., Li, D. S., & Zhong, C. K. (2006). On the dynamics of a class of nonclassical parabolic
equations. J. Math. Anal. Appl., 317, 565-582.
[11] Temam, R. (1997). In_nite-dimensional dynamical systems in mechanics and physic. New York: Springer.
[12] Sun, C. Y., & Yang, M. H. (2008). Dynamics of the nonclassical di_usion equations. Asymptot. Anal., 59, 51-81.
[13] Liu, Y. F., & Ma, Q. Z. (2009). Exponential attractors for a nonclassical diffusion equation. Electronic Journal of
Differential Equations, 9, 1-9.
[14] Ma, Q. Z., Liu, Y. F., & Zhang, F. H. (2012). Global attractors in H1(RN) for nonclassical di_usion equations.
Discrete Dynamics in Nature and Society, 1-17. doi:10.1155/2012/672762.
[15] Wu, H. Q., & Zhang, Z. Y. (2011). Asymptotic regularity for the nonclassical diffusion equation with lower
regular forcing term. Dynamical Systems: An International Journal, 26 (4), 391-400.
[16] Zhao, T. G., Wu, Y. J., & Ma, H. P. (2012). Error analysis of Chebyshev-Legendre pseudo-spectral method for a
class of nonclassical parabolic equation. Journal of Scientiffic Computing, 52 (3), 588-602.
[17] Zhao, T. G., Wu, Y. J., & Ma, H. P. (2010). Chebyshev-Legendre pseudospectral method for nonclassical
parabolic equation. Journal of Information and Computational Science, 7 (8), 1809-1817.
[18] Sun, C. Y. (2010). Asymptotic regularity for some dissipative equations. Journal of Differential Equations, 248
(2), 342-362.
[19] Miranville, A., & Zelik, S. Attractors for dissipative partial differential equations in bounded and unbounded
domains (Handbook of Differential Equations, Evolutionary Partial Differential Equations, C. M. Dafermos &
M. Pokorny eds.). Amsterdam: Elsevier.
[20] Zelik, S. V. (2004). Asymptotic regularity of solutions of a nonautonomous damped wave equation with a critical
growth exponent. Comm. Pure Appl.Anal., 3, 921{934.
[21] Zhang, F. H., & Liu, Y. F. (2014). Pullback attractors in H1(RN) for nonautonomous nonclassical di_usion
equations. Dynamical Systems, 29 (1), 106-118.
[22] Pan, L. X., & Liu, Y. F. (2013). Robust exponential attractors for the nonautonomous nonclassical di_usion
equation with memory. Dynamical Systems, 28 (4), 501-517.
DOI: http://dx.doi.org/10.3968/4556
DOI (PDF): http://dx.doi.org/10.3968/pdf_9
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