A Characterization of backward bounded solutions
Abstract
We prove that the collection M-∞ of backward bounded solutions for a semilinear evolution equation is the graph of an upper hemicontinuous set-valued function from the low Fourier modes to the higher Fourier modes, which is invariant and contains the global attractor. We also show that there exists a limit M∞ of finite dimensional Lipschitz manifolds Mt generated by the time t-maps (t>0) from the flat manifold M0 with the Hausdorff distance and we find M∞ ⊂ M-∞. No spectral gap conditions are assumed.
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