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Finite-dimensional global and exponential attractors for the reaction-diffusion problem with an obstacle potential

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 Added by Antonio Segatti
 Publication date 2009
  fields
and research's language is English




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A reaction-diffusion problem with an obstacle potential is considered in a bounded domain of $R^N$. Under the assumption that the obstacle $K$ is a closed convex and bounded subset of $mathbb{R}^n$ with smooth boundary or it is a closed $n$-dimensional simplex, we prove that the long-time behavior of the solution semigroup associated with this problem can be described in terms of an exponential attractor. In particular, the latter means that the fractal dimension of the associated global attractor is also finite.



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