Corrigendum to:“ A note of topological pressure for non-compact sets of a factor map” [Chaos Solitons Fract 2013;49:72–7]

AbstractWe give a new definition of topological pressure for arbitrary (non-compact, non-invariant) Borel subsets of metric spaces. This new quantity is defined via a suitable variational principle, leading to an alternative definition of an equilibrium state. We study the properties of this new quantity and compare it with existing notions of topological pressure. We are particularly interested in the situation when the ambient metric space is assumed to be compact. We motivate our definition by applying it to some interesting examples, including the level sets of the pointwise Lyapunov exponent for the Manneville–Pomeau family of maps.

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On the variational principle for the topological pressure for certain non-compact sets

Science China Mathematics ◽

10.1007/s11425-009-0109-4 ◽

2009 ◽

Vol 53 (4) ◽

pp. 1117-1128 ◽

Cited By ~ 7

Author(s):

Yu Pei ◽

ErCai Chen

Keyword(s):

Variational Principle ◽

Topological Pressure ◽

Compact Sets

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Topological Pressure of Free Semigroup Actions for Non-Compact Sets and Bowen’s Equation, I

Journal of Dynamics and Differential Equations ◽

10.1007/s10884-021-09983-3 ◽

2021 ◽

Author(s):

Qian Xiao ◽

Dongkui Ma

Keyword(s):

Free Semigroup ◽

Topological Pressure ◽

Compact Sets ◽

Semigroup Actions

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Topological Pressure of Free Semigroup Actions For Non-Compact Sets and Bowen’s Equation, II

Journal of Dynamics and Differential Equations ◽

10.1007/s10884-021-10055-9 ◽

2021 ◽

Author(s):

Qian Xiao ◽

Dongkui Ma

Keyword(s):

Free Semigroup ◽

Topological Pressure ◽

Compact Sets ◽

Semigroup Actions

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Nonadditive measure-theoretic pressure and applications to dimensions of an ergodic measure

Ergodic Theory and Dynamical Systems ◽

10.1017/s0143385712000090 ◽

2012 ◽

Vol 33 (3) ◽

pp. 831-850 ◽

Cited By ~ 12

Author(s):

YONGLUO CAO ◽

HUYI HU ◽

YUN ZHAO

Keyword(s):

Variational Principle ◽

Hausdorff Dimension ◽

Ergodic Measure ◽

Topological Pressure ◽

Compact Sets ◽

Equivalent Definition ◽

Ergodic Measures ◽

Nonadditive Measure ◽

Definition Of ◽

Conformal Repeller

AbstractWithout any additional conditions on subadditive potentials, this paper defines subadditive measure-theoretic pressure, and shows that the subadditive measure-theoretic pressure for ergodic measures can be described in terms of measure-theoretic entropy and a constant associated with the ergodic measure. Based on the definition of topological pressure on non-compact sets, we give another equivalent definition of subadditive measure-theoretic pressure, and obtain an inverse variational principle. This paper also studies the superadditive measure-theoretic pressure which has similar formalism to the subadditive measure-theoretic pressure. As an application of the main results, we prove that an average conformal repeller admits an ergodic measure of maximal Hausdorff dimension. Furthermore, for each ergodic measure supported on an average conformal repeller, we construct a set whose dimension is equal to the dimension of the measure.

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A closer look at the stable completion

10.23943/princeton/9780691161686.003.0005 ◽

2017 ◽

Author(s):

Ehud Hrushovski ◽

François Loeser

Keyword(s):

Inverse Limit ◽

Unit Vector ◽

Vector Spaces ◽

Dimensional Vector ◽

Compact Sets ◽

Linear Topology ◽

Topological Embedding ◽

Definable Set ◽

Finite Dimensional ◽

The One

This chapter introduces the concept of stable completion and provides a concrete representation of unit vector Mathematical Double-Struck Capital A superscript n in terms of spaces of semi-lattices, with particular emphasis on the frontier between the definable and the topological categories. It begins by constructing a topological embedding of unit vector Mathematical Double-Struck Capital A superscript n into the inverse limit of a system of spaces of semi-lattices L(Hsubscript d) endowed with the linear topology, where Hsubscript d are finite-dimensional vector spaces. The description is extended to the projective setting. The linear topology is then related to the one induced by the finite level morphism L(Hsubscript d). The chapter also considers the condition that if a definable set in L(Hsubscript d) is an intersection of relatively compact sets, then it is itself relatively compact.

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