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Auteurs principaux: Kourliouros, Konstantinos, Longo, Iacopo P., Rasmussen, Martin
Format: Preprint
Publié: 2026
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Accès en ligne:https://arxiv.org/abs/2604.26713
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author Kourliouros, Konstantinos
Longo, Iacopo P.
Rasmussen, Martin
author_facet Kourliouros, Konstantinos
Longo, Iacopo P.
Rasmussen, Martin
contents In this paper we propose a finite-dimensional and deterministic approach to the study of invariant sets of certain nonautonomous differential inclusions naturally arising in the context of random and control dynamical systems, as well as in systems modeling the dynamical propagation of uncertainty. In particular, to any such differential inclusion, we associate a finite-dimensional and deterministic system of nonautonomous ordinary differential equations, which we call the boundary system, due to its following characteristic property: invariant sets of the differential inclusion lift in a unique way to backward invariant unit normal cones of the associated boundary system, and these are even invariant if the boundary is smooth. We further illustrate the strength of this approach in the study of minimal attractors of nonautonomous linear differential inclusions. Under the natural assumption of exponential stability for the unperturbed problem, we establish existence and uniqueness of a minimal attractor for the differential inclusion with fiberwise strictly convex, closed, and continuously differentiable boundaries. We also show that the unit normal bundle is in fact the pullback attractor for the skew-product flow associated to the boundary system which extends to the global attractor when the underlying admits a compact base.
format Preprint
id arxiv_https___arxiv_org_abs_2604_26713
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Invariant Sets and Boundary Systems of Nonautonomous Differential Inclusions
Kourliouros, Konstantinos
Longo, Iacopo P.
Rasmussen, Martin
Dynamical Systems
In this paper we propose a finite-dimensional and deterministic approach to the study of invariant sets of certain nonautonomous differential inclusions naturally arising in the context of random and control dynamical systems, as well as in systems modeling the dynamical propagation of uncertainty. In particular, to any such differential inclusion, we associate a finite-dimensional and deterministic system of nonautonomous ordinary differential equations, which we call the boundary system, due to its following characteristic property: invariant sets of the differential inclusion lift in a unique way to backward invariant unit normal cones of the associated boundary system, and these are even invariant if the boundary is smooth. We further illustrate the strength of this approach in the study of minimal attractors of nonautonomous linear differential inclusions. Under the natural assumption of exponential stability for the unperturbed problem, we establish existence and uniqueness of a minimal attractor for the differential inclusion with fiberwise strictly convex, closed, and continuously differentiable boundaries. We also show that the unit normal bundle is in fact the pullback attractor for the skew-product flow associated to the boundary system which extends to the global attractor when the underlying admits a compact base.
title Invariant Sets and Boundary Systems of Nonautonomous Differential Inclusions
topic Dynamical Systems
url https://arxiv.org/abs/2604.26713