Title of article
Exponential attractors for reaction–diffusion equations with arbitrary polynomial growth Original Research Article
Author/Authors
Yansheng Zhong، نويسنده , , Chengkui Zhong، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
15
From page
751
To page
765
Abstract
In this paper, we study exponential attractors for an equation with arbitrary polynomial growth nonlinearity ff and inhomogeneous term gg. First, we prove by the ℓℓ-trajectory method that the exponential attractor in L2(Ω)L2(Ω) with g∈H−1(Ω)g∈H−1(Ω). Second, by proving the semigroup satisfying discrete squeezing property, we obtain the exponential attractor in View the MathML sourceH01(Ω) with g∈L2(Ω)g∈L2(Ω). Because the solutions without higher regularity than L2p−2(Ω)L2p−2(Ω) for gg belong only to L2(Ω)L2(Ω) in the equation, the general method by proving the Lipschitz continuity between L2p−2(Ω)L2p−2(Ω) and L2(Ω)L2(Ω) does not work in our case. Therefore, we give a new method (presented in a theorem) to obtain an exponential attractor in a stronger topology space i.e., L2p−2(Ω)L2p−2(Ω) with g∈Gg∈G (stated in a definition) when it is out of reach for the other known techniques
Keywords
Asymptotic a priori estimate , Discrete squeezing property , global attractor , Supercritical nonlinearity , semigroup , Exponential attractor
Journal title
Nonlinear Analysis Theory, Methods & Applications
Serial Year
2009
Journal title
Nonlinear Analysis Theory, Methods & Applications
Record number
861216
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