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Title: Equivalence of ill-posed dynamical systems (English)
Author: Suda, Tomoharu
Language: English
Journal: Archivum Mathematicum
ISSN: 0044-8753 (print)
ISSN: 1212-5059 (online)
Volume: 59
Issue: 1
Year: 2023
Pages: 133-140
Summary lang: English
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Category: math
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Summary: The problem of topological classification is fundamental in the study of dynamical systems. However, when we consider systems without well-posedness, it is unclear how to generalize the notion of equivalence. For example, when a system has trajectories distinguished only by parametrization, we cannot apply the usual definition of equivalence based on the phase space, which presupposes the uniqueness of trajectories. In this study, we formulate a notion of “topological equivalence” using the axiomatic theory of topological dynamics proposed by Yorke [7], where dynamical systems are considered to be shift-invariant subsets of a space of partial maps. In particular, we study how the type of problems can be regarded as invariants under the morphisms between systems and how the usual definition of topological equivalence can be generalized. This article is intended to also serve as a brief introduction to the axiomatic theory of ordinary differential equations (or topological dynamics) based on the formalism presented in [6]. (English)
Keyword: dynamical systems
Keyword: topological dynamics
Keyword: topological equivalence
Keyword: axiomatic theory of ordinary differential equations
MSC: 34A06
MSC: 34A34
MSC: 37B02
MSC: 37B55
idZBL: Zbl 07675582
idMR: MR4563024
DOI: 10.5817/AM2023-1-133
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Date available: 2023-02-22T14:36:21Z
Last updated: 2023-05-04
Stable URL: http://hdl.handle.net/10338.dmlcz/151558
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Reference: [1] Aubin, J.P., Cellina, A.: Differential Inclusions.Springer-Verlag, Berlin, 1984. Zbl 0538.34007
Reference: [2] Ball, J.M.: Continuity properties and global attractors of generalized semiflows and the Navier-Stokes equations.Mechanics: from theory to computation, Springer, New York, 2000, pp. 447–474.
Reference: [3] Filippov, V.V.: The topological structure of solution spaces of ordinary differential equations.Russ. Math. Surv. 48 (101) (1993), 101–154, Translated from Uspekhi Mat. Nauk. 48, no. 1, 103–154. 10.1070/RM1993v048n01ABEH000986
Reference: [4] Filippov, V.V.: Basic Topological Structures of Ordinary Differential Equations.Kluwer Acad., Dortrecht, 1998.
Reference: [5] Kuznetsov, Y.A.: Elements of Applied Bifurcation Theory.second ed., Springer-Verlag, New York, 1998. Zbl 0914.58025
Reference: [6] Suda, T.: Equivalence of topological dynamics without well-posedness.Topology Appl. 312 (2022), 25 pp., Paper No. 108045. MR 4387928, 10.1016/j.topol.2022.108045
Reference: [7] Yorke, J.A.: Spaces of solutions.Mathematical Systems Theory and Economics I/II, (Proc. Internat. Summer School, Varenna, 1967). Lecture Notes in Operations Research and Mathematical Economics, Vols. 11, 12, Springer, Berlin, 1969, pp. 383–403.
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