Decidability of chaos for some families of dynamical systems

Alexander Arbieto; Carlos Matheus

doi:10.1007/s10208-003-0085-y

Decidability of chaos for some families of dynamical systems

Alexander Arbieto
, Carlos Matheus

IMPA

Research output: Contribution to journal › Article › peer-review

Abstract

We show that the existence of positive Lyapounov exponents and/or SRB measures are undecidable (in the algorithmic sense) properties within some parametrized families of interesting dynamical systems: the quadratic family and Hénon maps. Because the existence of positive exponents (or SRB measures) is, in a natural way, a manifestation of "chaos," these results may be understood as saying that the chaotic character of a dynamical system is undecidable. Our investigation is directly motivated by questions asked by Carleson and Smale in this direction.

Original language	English
Pages (from-to)	269-275
Number of pages	7
Journal	Foundations of Computational Mathematics
Volume	4
Issue number	3
DOIs	https://doi.org/10.1007/s10208-003-0085-y
Publication status	Published - 1 Aug 2004
Externally published	Yes

Keywords

Chaos
Decidability
Lyapounov exponents
SRB measures
Topological entropy

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10.1007/s10208-003-0085-y

Cite this

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abstract = "We show that the existence of positive Lyapounov exponents and/or SRB measures are undecidable (in the algorithmic sense) properties within some parametrized families of interesting dynamical systems: the quadratic family and H{\'e}non maps. Because the existence of positive exponents (or SRB measures) is, in a natural way, a manifestation of {"}chaos,{"} these results may be understood as saying that the chaotic character of a dynamical system is undecidable. Our investigation is directly motivated by questions asked by Carleson and Smale in this direction.",

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author = "Alexander Arbieto and Carlos Matheus",

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AU - Arbieto, Alexander

AU - Matheus, Carlos

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N2 - We show that the existence of positive Lyapounov exponents and/or SRB measures are undecidable (in the algorithmic sense) properties within some parametrized families of interesting dynamical systems: the quadratic family and Hénon maps. Because the existence of positive exponents (or SRB measures) is, in a natural way, a manifestation of "chaos," these results may be understood as saying that the chaotic character of a dynamical system is undecidable. Our investigation is directly motivated by questions asked by Carleson and Smale in this direction.

AB - We show that the existence of positive Lyapounov exponents and/or SRB measures are undecidable (in the algorithmic sense) properties within some parametrized families of interesting dynamical systems: the quadratic family and Hénon maps. Because the existence of positive exponents (or SRB measures) is, in a natural way, a manifestation of "chaos," these results may be understood as saying that the chaotic character of a dynamical system is undecidable. Our investigation is directly motivated by questions asked by Carleson and Smale in this direction.

KW - Chaos

KW - Decidability

KW - Lyapounov exponents

KW - SRB measures

KW - Topological entropy

U2 - 10.1007/s10208-003-0085-y

DO - 10.1007/s10208-003-0085-y

M3 - Article

AN - SCOPUS:4744348275

SN - 1615-3375

VL - 4

SP - 269

EP - 275

JO - Foundations of Computational Mathematics

JF - Foundations of Computational Mathematics

IS - 3

ER -

Decidability of chaos for some families of dynamical systems

Abstract

Keywords

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