Integral manifolds and their attraction property for evolution equations in admissible function spaces (Q439193)

The authors investigate the existence of a center-stable integral manifold for the solutions of the semi-linear evolution equation NEWLINE\[NEWLINEu(t)=U(t,s)u(s)+\displaystyle\int_s^tU(t,\xi)f(\xi,u(\xi))\,d\xi,\,\,\,t\geq s\geq 0.NEWLINE\]NEWLINE Here, the linear part, the evolution family \((U(t,s))_{t\geq s\geq 0}\), has an exponential trichotomy on the half-line and the nonlinear forcing term \(f\) satisfies the \(\varphi\)-Lipschitz condition, that is NEWLINE\[NEWLINE\|f(x)-f(y)\|\leq\varphi(t)\|x-y\|,NEWLINE\]NEWLINE where \(\varphi\) belongs to some class of admissible function spaces on the half-line. They use the Lyapunov-Perron method, the rescaling procedures and some admissible function spaces. The existence of unstable integral manifolds and their attraction property for evolution equations defined on the whole line are also studied.