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Shadowing for infinite dimensional dynamics and exponential trichotomies

Lucas Backes, Davor Dragičević

2020Proceedings of the Royal Society of Edinburgh Section A Mathematics32 citationsDOIOpen Access PDF

Abstract

Let $(A_m)_{m \in {\mathop Z}}$ be a sequence of bounded linear maps acting on an arbitrary Banach space X and admitting an exponential trichotomy and let $f_m:X \to X$ be a Lispchitz map for every $m\in {\mathop Z} $ . We prove that whenever the Lipschitz constants of $f_m$ , $m \in {\mathop Z} $ , are uniformly small, the nonautonomous dynamics given by $x_{m+1}=A_mx_m+f_m(x_m)$ , $m\in {\mathop Z} $ , has various types of shadowing. Moreover, if X is finite dimensional and each $A_m$ is invertible we prove that a converse result is also true. Furthermore, we get similar results for one-sided and continuous time dynamics. As applications of our results, we study the Hyers–Ulam stability for certain difference equations and we obtain a very general version of the Grobman–Hartman's theorem for nonautonomous dynamics.

Topics & Concepts

MathematicsTrichotomy (philosophy)Exponential dichotomyBounded functionBanach spaceLipschitz continuityConverseMathematical analysisInvertible matrixSequence (biology)Exponential functionPure mathematicsSpace (punctuation)Exponential stabilitySobolev spaceStability (learning theory)Dynamics (music)Uniform boundednessHilbert spaceBounded variationConverse theoremC0-semigroupDiscrete mathematicsAbsolute continuityExponential growthBounded inverse theoremDomain (mathematical analysis)Exponential decayUniform continuityConstant (computer programming)Linear systemInverseObserver (physics)Nonlinear Differential Equations AnalysisMathematical Dynamics and FractalsAdvanced Differential Equations and Dynamical Systems