INVARIANT STABLE MANIFOLDS FOR PARTIAL FUNCTIONAL DIFFERENTIAL EQUATIONS WITH FINITE DELAY
Abstract
We prove the existence of invarinat stable manifolds for the solutions to the equation
in the case where the evolution family (U(t,s))t≥s≥0 has an exponential dichotomy on a half-line, and the nonlinear forcing term g satisfies the 
-Lipschitz conditions, i.e., 
, where 
belongs to some classes of admissible function space. Our main method is based on the addmissibility of function space.
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