Abstract
The purpose of this work is to investigate the asymptotic behaviours of solutions for the discrete Klein-Gordon-Schrödinger type equations in one-dimensional lattice. We first establish the global existence and uniqueness of solutions for the corresponding Cauchy problem. According to the solution's estimate, it is shown that the semi-group generated by the solution is continuous and possesses an absorbing set. Using truncation technique, we show that there exists a global attractor for the semi-group. Finally, we extend the criteria of Zhou et al. [S. Zhou, C. Zhao, and Y. Wang, Finite dimensionality and upper semicontinuity of compact kernel sections of non-autonomous lattice systems, Discrete Contin. Dyn. Syst. A 21 (2008), pp. 1259-1277.] for finite fractal dimension of a family of compact subsets in a Hilbert space to obtain an upper bound of fractal dimension for the global attractor.
Original language | English |
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Pages (from-to) | 1404-1426 |
Number of pages | 23 |
Journal | Journal of Difference Equations and Applications |
Volume | 20 |
Issue number | 10 |
DOIs | |
State | Published - Oct 2014 |
Keywords
- absorbing set
- asymptotic nullness
- fractal dimension
- global attractor
- truncation technique