Unstable manifolds for rough evolution equations
Abstract
In this paper, we consider a class of evolution equations driven by finite-dimensional γ-H\"older rough paths, where γ∈(1/3,1/2]. We prove the global-in-time solutions of rough evolution equations(REEs) in a sutiable space, also obtain that the solutions generate random dynamical systems. Meanwhile, we derive the existence of local unstable manifolds for such equations by a properly discretized Lyapunov-Perron method.
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