On admissibility for parabolic equations in Rn
Abstract
We consider the parabolic equation ut- u=F(x,u), (t,x)∈+×nP and the corresponding semiflow π in the phase space H1. We give conditions on the nonlinearity F(x,u), ensuring that all bounded sets of H1 are π-admissibile in the sense of Rybakowski. If F(x,u) is asymptotically linear, under appropriate non-resonance conditions, we use Conley's index theory to prove the existence of nontrivial equilibria of (P) and of heteroclinic trajectories joining some of these equilibria. The results obtained in this paper extend earlier results of Rybakowski concerning parabolic equations on bounded open subsets of n.
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