On the persistence of k-exponential separation of linear cocycles under a small perturbation

Abstract

In this paper, the concept about a k-exponential separation of a linear cocycle (F,G) on K× X is extended for a general linear coclye whose base space K and fibre-map-value map G become a nonempty set and a continuous map from K to L(X) respectvely, by removing the prior assumptions in the classical sense that K is a compact set contained in the Banach space X, and G(x) is compact for any x∈ K. We prove that (F,G) on K× X admits a k-exponential separation if the cocycle (F,G) is generated from a linear cocycle (F,T) on K× X adimtting a k-exponential separation with K being compact in the classical sense via a small perturbation. We also obtain some consequent results with their needed concepts spinning off from the one of a k-exponential separation of (F,G) on K× X, as well as the unified terminology system around k-exponential separation is normalized. We apply our results to analyze the linearized structure near by an invariant set of a system generated from a dissipative system via a small perturbation, where the small perturbation is without the restriction of compactness.