Exponential dichotomy for a class of asymptotically autonomous delayed differential equations
Abstract
In this work we give a criterion to have an exponential dichotomy over all R for delayed systems x'(t)=L(t)xt, where L=t∞L(t), and the systems x'(t)=Lxt are autonomous and hyperbolic. The proof is based in a suitable choice of weighted Sobolev spaces Lp(R,μ) and W1,p(R,μ), where the involves differential operators become Fredholm's operators and this property are strongly exploited.
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