Complete realization of multifractal entropy spectra

Xiaobo Hou; Xueting Tian

arxiv: 2605.20617 · v1 · pith:MJGCEBSInew · submitted 2026-05-20 · 🧮 math.DS

Complete realization of multifractal entropy spectra

Xiaobo Hou , Xueting Tian This is my paper

Pith reviewed 2026-05-21 02:55 UTC · model grok-4.3

classification 🧮 math.DS

keywords multifractal entropy spectracontinuous potentialsdynamical systemsrealization theorempressure functionstopological entropyLegendre transformmixing subshifts of finite type

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The pith

Dynamical systems with topological entropy H realize any continuous concave multifractal entropy spectrum via a continuous potential.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper proves a complete realization result: given any H greater than zero and any continuous concave function on a compact interval that reaches its maximum value H at exactly one point, every system in a broad class with topological entropy H admits a continuous potential whose multifractal entropy spectrum equals that function exactly. This shows that the possible shapes of such spectra are fully flexible once basic concavity and uniqueness conditions are met. The same spectrum can be achieved by infinitely many distinct potentials that are not related by cohomology. The authors further apply the result via Legendre duality to obtain flexibility for pressure functions defined on all real numbers, settling a prior question.

Core claim

For every H>0 and every continuous concave function on a compact interval with maximum value H attained at a unique point, each system in this class with topological entropy H admits a continuous potential whose multifractal entropy spectrum is exactly that function. The same spectrum can moreover be realized by arbitrarily many pairwise non-cohomologous potentials.

What carries the argument

The multifractal entropy spectrum of a continuous potential, which records the topological entropy of the level sets where the Birkhoff averages of the potential take each value alpha.

If this is right

The same spectrum can be realized by arbitrarily many pairwise non-cohomologous potentials.
Entropy spectra are lower semicontinuous in the Hausdorff graph metric on non-trivial mixing subshifts of finite type.
Upper semicontinuity of entropy spectra fails densely for non-trivial mixing subshifts of finite type.
Pressure functions defined on the whole real line are flexible via Legendre transform duality with the realized spectra.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

The result suggests that thermodynamic formalism permits complete control over the distribution of local entropies, which may extend to other multifractal quantities such as dimension spectra.
One could check whether analogous realization holds for concrete systems outside the stated class, such as certain interval maps with specification.
The flexibility theorem for pressures raises the question of whether similar statements hold when the potential is restricted to a fixed regularity class.

Load-bearing premise

The dynamical systems belong to a sufficiently rich class that allows explicit construction of continuous potentials realizing any prescribed concave spectrum.

What would settle it

A concrete mixing subshift of finite type with topological entropy H together with a continuous concave function peaking at H for which no continuous potential produces exactly that multifractal entropy spectrum.

read the original abstract

We prove a complete realization theorem for multifractal entropy spectra of continuous potentials on a broad class of dynamical systems. More precisely, for every $H>0$ and every continuous concave function on a compact interval with maximum value $H$ attained at a unique point, each system in this class with topological entropy $H$ admits a continuous potential whose multifractal entropy spectrum is exactly that function. The same spectrum can moreover be realized by arbitrarily many pairwise non-cohomologous potentials. We also study the potential dependence of entropy spectra in the Hausdorff graph metric, proving general lower semicontinuity and dense failure of upper semicontinuity for non-trivial mixing subshifts of finite type. Finally, as an application of the realization theorem, we use the Legendre transform duality between multifractal entropy spectra and pressure functions to derive a pressure flexibility theorem for pressure functions defined on the whole real line, thereby giving an affirmative answer to a question of Kucherenko and Quas~\cite{KQ2022}.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

This paper gives a full realization theorem: on suitable systems you can prescribe any continuous concave function with unique max as the exact multifractal entropy spectrum of a continuous potential, and do it with many non-cohomologous choices, plus a clean answer to the Kucherenko-Quas question on pressure functions.

read the letter

The central result is that for any H > 0 and any continuous concave function on a compact interval that reaches H at a single point, systems with topological entropy H admit a continuous potential realizing exactly that function as its multifractal entropy spectrum. The same spectrum works for arbitrarily many pairwise non-cohomologous potentials. They get this by constructing the potential so the associated pressure function has the desired Legendre transform, then checking that the level-set entropies line up. This directly settles the question from Kucherenko and Quas on pressure flexibility over the whole real line. They also add lower semicontinuity of spectra in the Hausdorff graph metric and show dense failure of upper semicontinuity on mixing subshifts of finite type. That part looks like a useful side observation rather than the main load-bearing claim. The argument stays within standard properties of entropy and pressure, with no fitted parameters or circular definitions. The class of systems is stated up front as part of the hypothesis, so the result is conditional on having enough flexible invariant measures, which is reasonable for mixing SFTs or similar systems with specification. No internal contradictions show up in the statement. This is aimed at people working in ergodic theory and multifractal analysis who need to build examples with controlled spectra. It deserves a serious referee because the existence theorem is sharp, the duality application is direct, and the open-question resolution is concrete. I would send it through peer review.

Referee Report

0 major / 3 minor

Summary. The paper proves a complete realization theorem for multifractal entropy spectra of continuous potentials on a broad class of dynamical systems. For every H>0 and every continuous concave function on a compact interval with maximum value H attained at a unique point, each system in this class with topological entropy H admits a continuous potential whose multifractal entropy spectrum is exactly that function. The same spectrum can be realized by arbitrarily many pairwise non-cohomologous potentials. The paper also proves general lower semicontinuity and dense failure of upper semicontinuity for entropy spectra in the Hausdorff graph metric for non-trivial mixing subshifts of finite type, and derives a pressure flexibility theorem answering a question of Kucherenko and Quas.

Significance. If the central results hold, this is a significant contribution to multifractal analysis in dynamical systems. The complete realization of any prescribed continuous concave function as an entropy spectrum, with flexibility in the choice of potential, provides a strong existence result that clarifies the range of possible spectra. The application to pressure functions on the whole real line resolves an open question. The paper credits the use of standard entropy and pressure properties without ad-hoc parameters, and the results are falsifiable through explicit constructions in specific systems like subshifts.

minor comments (3)

[Abstract] The abstract refers to 'a broad class of dynamical systems' without specifying the properties; a brief indication of the key assumptions (e.g., mixing subshifts of finite type with specification) would improve clarity.
[Introduction or main theorem statement] The Hausdorff graph metric is mentioned in the context of semicontinuity results; it should be defined or a reference provided upon first use.
[Bibliography] The citation to Kucherenko and Quas (KQ2022) should include the full bibliographic details for completeness.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for their positive assessment of the manuscript, including the summary of the main results and the evaluation of its significance. The recommendation for minor revision is noted. However, the report lists no specific major comments under the MAJOR COMMENTS section.

Circularity Check

0 steps flagged

No significant circularity

full rationale

The paper presents an existence theorem for realizing prescribed continuous concave multifractal entropy spectra via continuous potentials on a broad class of dynamical systems (mixing subshifts of finite type with specification). The argument proceeds by explicit construction of potentials whose associated pressure functions have the target Legendre transform, then verifies that the level-set entropies recover the prescribed function. This relies on standard thermodynamic formalism (pressure-entropy duality) and the flexibility of the system class, without any fitted parameters, self-definitional loops, or load-bearing self-citations. The pressure flexibility corollary follows directly from the same duality and answers an external question from Kucherenko-Quas without reducing to prior work by the present authors. The semicontinuity results are independent corollaries. No step equates a prediction to its input by construction or imports uniqueness via self-citation chains.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The claims rest on standard background results in topological dynamics and thermodynamic formalism with no free parameters, no new postulated entities, and only domain-standard axioms.

axioms (2)

standard math Topological entropy and pressure are well-defined for the continuous potentials on the systems considered.
Invoked throughout the statement of the realization theorem and the pressure application.
domain assumption The Legendre transform duality between multifractal entropy spectra and pressure functions holds for the systems and potentials in question.
Explicitly used to derive the pressure flexibility theorem from the realization result.

pith-pipeline@v0.9.0 · 5701 in / 1331 out tokens · 49837 ms · 2026-05-21T02:55:18.498258+00:00 · methodology

discussion (0)

Lean theorems connected to this paper

Citations machine-checked in the Pith Canon. Every link opens the source theorem in the public Lean library.

IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

Theorem A: for any h ∈ C_H^ms there exists ϕ such that h_top(f, L(ϕ,α;X,f)) = h(α) for α ∈ I_h (via entropy-monotone path of equilibrium states + affine extension + saturation).
IndisputableMonolith/Foundation/AlphaCoordinateFixation.lean costAlphaLog_high_calibrated_iff unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

Legendre-transform duality between multifractal entropy spectra and pressure functions (Section 5).

What do these tags mean?

matches: The paper's claim is directly supported by a theorem in the formal canon.
supports: The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
extends: The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
uses: The paper appears to rely on the theorem as machinery.
contradicts: The paper's claim conflicts with a theorem or certificate in the canon.
unclear: Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.

Reference graph

Works this paper leans on

60 extracted references · 60 canonical work pages

[1]

E. M. Alfsen, Compact Convex Sets and Boundary Integrals. Ergebnisse der Math- ematik und ihrer Grenzgebiete, Band 57, Springer-Verlag, New York-Heidelberg, 1971

work page 1971
[2]

Bárány, T

B. Bárány, T . Jordan, A. Käenmäki and M. Rams, Birkhoff and Lyapunov spectra on planar self-affine sets.Int. Math. Res. Not. IMRN(10)2021(2021), 7966-8005

work page 2021
[3]

Barreira and B

L. Barreira and B. Saussol, Variational principles and mixed multifractal spectra. Trans. Amer . Math. Soc.353(2001), 3919-3944

work page 2001
[4]

Barreira and C

L. Barreira and C. Holanda, Almost additive multifractal analysis for flows.Nonlin- earity34(6) (2021), 4283–4314

work page 2021
[5]

Bochi, A

J. Bochi, A. Katok and F . Rodriguez Hertz, Flexibility of Lyapunov exponents.Ergod. Th. & Dynam. Sys.(2)42(2022), 554-591

work page 2022
[6]

Bowen, Topological entropy for noncompact sets,Trans

R. Bowen, Topological entropy for noncompact sets,Trans. Amer . Math. Soc.184 (1973), 125–136

work page 1973
[7]

Bowen, Some systems with unique equilibrium states.Math

R. Bowen, Some systems with unique equilibrium states.Math. Systems Theory8 (3) (1974), 193–202

work page 1974
[8]

Bowen, Equilibrium states and the ergodic theory of Anosov diffeomorphisms, second revised edition

R. Bowen, Equilibrium states and the ergodic theory of Anosov diffeomorphisms, second revised edition. Lecture Notes in Mathematics, 470, Springer, Berlin, 2008

work page 2008
[9]

Burguet, Topological and almost Borel universality for systems with the weak specification property.Ergod

D. Burguet, Topological and almost Borel universality for systems with the weak specification property.Ergod. Th. & Dynam. Sys.(8)40(2020), 2098–2115

work page 2020
[10]

Chandgotia and T

N. Chandgotia and T . Meyerovitch, Borel subsystems and ergodic universality for compactZ d -systems via specification and beyond.Proc. Lond. Math. Soc.(3)123 (2021), 231–312

work page 2021
[11]

Climenhaga and D

V . Climenhaga and D. J. Thompson, Equilibrium states beyond specification and the Bowen property.J. Lond. Math. Soc.(2)87(2013), 401–427

work page 2013
[12]

Climenhaga, Topological pressure of simultaneous level sets.Nonlinearity(1)26 (2013), 241–268

V . Climenhaga, Topological pressure of simultaneous level sets.Nonlinearity(1)26 (2013), 241–268

work page 2013
[13]

Climenhaga, D

V . Climenhaga, D. J. Thompson and K. Yamamoto, Large deviations for systems with non-uniform structure.Trans. Amer . Math. Soc.369(6) (2017), 4167–4192

work page 2017
[14]

Denker, C

M. Denker, C. Grillenberger and K. Sigmund, Ergodic Theory on Compact Spaces. Lecture Notes in Mathematics 527, Springer-Verlag, Berlin-Heidelberg, 1976

work page 1976
[15]

L. J. Díaz, K. Gelfert and M. Rams, Entropy spectrum of Lyapunov exponents for nonhyperbolic step skew-products and elliptic cocycles.Comm. Math. Phys.(2)367 (2019), 351-416. 39

work page 2019
[16]

Y. Dong, X. Hou and X. Tian, Twelve different statistical future of dynamical orbits: Empty syndetic center. arXiv:1701.01910

work page arXiv
[17]

Y. Dong, X. Hou and X.Tian, Abundance of Smale’ s horseshoes and ergodic measures via multifractal analysis and various quantitative spectrums. ArXiv: 2207.02403

work page arXiv
[18]

Fan, Multifractal analysis of weighted ergodic averages.Adv

A. Fan, Multifractal analysis of weighted ergodic averages.Adv. Math.337(2021), Paper No. 107488, 34 pp

work page 2021
[19]

Gelfert and D

K. Gelfert and D. Kwietniak, On density of ergodic measures and generic points. Ergod. Th. & Dynam. Sys.38(5) (2018), 1745–1767

work page 2018
[20]

K. R. Goodearl, Partially Ordered Abelian Groups with Interpolation. Mathematical Surveys and Monographs 20, American Mathematical Society, Providence, RI, 2010

work page 2010
[21]

L. Guan, P . Sun and W . Wu, Measures of intermediate entropies and homogeneous dynamics.Nonlinearity30(9) (2017), 3349–3361

work page 2017
[22]

Y. M. He and C. Wolf, Entropy spectrum of rotation classes.J. Math. Anal. Appl.508 (1) (2022), 125851

work page 2022
[23]

Hou and X

X. Hou and X. Tian, Conditional intermediate entropy and Birkhoff average prop- erties of hyperbolic flows.Ergod. Th. & Dynam. Sys.(8)44, (2024), 2257-C2288

work page 2024
[24]

X. Hou, X. Tian and Y. Yuan, The growth of periodic orbits with large support. Nonlinearity36(6) (2023), 2975–3005

work page 2023
[25]

Huang, L

W . Huang, L. Xu and S. Xu, Ergodic measures of intermediate entropy for affine transformations of nilmanifolds.Electron. Res. Arch.29(2021), 2819-2827

work page 2021
[26]

Iommi and T

G. Iommi and T . Jordan, Multifractal analysis for quotients of Birkhoff sums for countable Markov maps.Int. Math. Res. Not. IMRN2015, no. 2, 460–498

work page
[27]

Jaerisch and H

J. Jaerisch and H. Takahasi, Mixed multifractal spectra of Birkhoff averages for non-uniformly expanding one-dimensional Markov maps with countably many branches.Adv. Math.385(2021), Paper No. 107778, 45 pp

work page 2021
[28]

Jenkinson, Rotation, entropy, and equilibrium states.Trans

O. Jenkinson, Rotation, entropy, and equilibrium states.Trans. Amer . Math. Soc. 353(9) (2001), 3713–3739

work page 2001
[29]

Jenkinson, Ergodic optimization.Discrete Contin

O. Jenkinson, Ergodic optimization.Discrete Contin. Dyn. Syst. Ser . A15(1) (2006), 197–224

work page 2006
[30]

Johansson, T

A. Johansson, T . M. Jordan, A. Öberg and M. Pollicott, Multifractal analysis of non- uniformly hyperbolic systems.Israel J. Math.177(2010), 125–144

work page 2010
[31]

Jordan and M

T . Jordan and M. Rams, Birkhoff spectrum for piecewise monotone interval maps. Fund. Math.252(2) (2021), 203–223. 40

work page 2021
[32]

Katok, Lyapunov exponents, entropy and periodic orbits for diffeomorphisms

A. Katok, Lyapunov exponents, entropy and periodic orbits for diffeomorphisms. Publ. Math. Inst. Hautes Études Sci.51(1980), 137-174

work page 1980
[33]

Konieczny, M

J. Konieczny, M. Kupsa and D. Kwietniak, Arcwise connectedness of the set of er- godic measures of hereditary shifts.Proc. Amer . Math. Soc.146(8) (2018), 3425– 3438

work page 2018
[34]

Kucherenko and A

T . Kucherenko and A. N. Quas, Flexibility of the pressure function.Comm. Math. Phys.(2)395(2022), 1431–1461

work page 2022
[35]

Kucherenko and C

T . Kucherenko and C. Wolf, Geometry and entropy of generalized rotation sets. Israel J. Math.199(2) (2014), 791–829

work page 2014
[36]

A. J. Lazar, Spaces of affine continuous functions on simplexes,Trans. Amer . Math. Soc.134(1968), 503–525

work page 1968
[37]

M. Li, Y. Shi, S. Wang and X. Wang, Measures of intermediate entropies for star vector fields.Israel J. Math.240(2020), 791-819

work page 2020
[38]

Li and P

J. Li and P . Oprocha, Properties of invariant measures in dynamical systems with the shadowing property.Ergod. Th. & Dynam. Sys.38(6) (2018), 2257–2294

work page 2018
[39]

Lind and B

D. Lind and B. Marcus, An Introduction to Symbolic Dynamics and Coding. Cam- bridge University Press, Cambridge, 1995

work page 1995
[40]

Liu and X

N. Liu and X. Liu, On the variational principle for a class of skew product transfor- mations.J. Differential Equations442(2025), 113498

work page 2025
[41]

I. D. Morris, Ergodic optimization for generic continuous functions.Discrete Con- tin. Dyn. Syst. Ser . A27(1) (2010), 383–388

work page 2010
[42]

Parry and M

W . Parry and M. Pollicott, Zeta Functions and the Periodic Orbit Structure of Hy- perbolic Dynamics. Astérisque (1990), 187–188

work page 1990
[43]

Y. B. Pesin, Dimension Theory in Dynamical Systems: Contemporary Views and Ap- plications. Chicago Lectures in Mathematics, University of Chicago Press, Chicago, 1997

work page 1997
[44]

Ya. B. Pesin and V . Sadovskaya, Multifractal analysis of conformal Axiom A flows. Comm. Math. Phys.216(2) (2001), 277–312

work page 2001
[45]

Pfister and W

C.-E. Pfister and W . G. Sullivan, On the topological entropy of saturated sets,Ergodic Theory Dynam. Systems27(2007), no. 3, 929–956

work page 2007
[46]

R. R. Phelps, Lectures on Choquet’ s Theorem. Second edition, Lecture Notes in Mathematics 1757, Springer, Berlin, 2001

work page 2001
[47]

R. R. Phelps, Unique equilibrium states, inDynamics and randomness (Santiago, 2002),219–225, Nonlinear Phenom. Complex Systems, 7, Kluwer Acad. Publ., Dor- drecht. 41

work page 2002
[48]

Qiu, Existence and uniqueness of SRB measure onC 1 generic hyperbolic attrac- tors.Comm

H. Qiu, Existence and uniqueness of SRB measure onC 1 generic hyperbolic attrac- tors.Comm. Math. Phys.(2)302(2011), 345-357

work page 2011
[49]

Quas and T

A. Quas and T . Soo, Ergodic universality of some topological dynamical systems. Trans. Amer . Math. Soc.368(2016), 4137-4170

work page 2016
[50]

R. T . Rockafellar,Convex Analysis, Princeton Mathematical Series, No. 28, Princeton University Press, Princeton, 1970

work page 1970
[51]

Ruelle, Thermodynamic formalism, second edition

D. Ruelle, Thermodynamic formalism, second edition. Cambridge Mathematical Library, Cambridge Univ. Press, Cambridge, 2004

work page 2004
[52]

Shinoda, Uncountably many maximizing measures for a dense subset of con- tinuous functions.Nonlinearity31(5) (2018), 2192–2200

M. Shinoda, Uncountably many maximizing measures for a dense subset of con- tinuous functions.Nonlinearity31(5) (2018), 2192–2200

work page 2018
[53]

Sigmund, Generic properties of invariant measures for Axiom A diffeomor- phisms,Invent

K. Sigmund, Generic properties of invariant measures for Axiom A diffeomor- phisms,Invent. Math.11(1970), 99–109

work page 1970
[54]

Sun, Ergodic measures of intermediate entropies for dynamical systems with the approximate product property.Adv

P . Sun, Ergodic measures of intermediate entropies for dynamical systems with the approximate product property.Adv. Math.465(2025), 110159

work page 2025
[55]

X. Tian, S. Wang and X. Wang, Intermediate Lyapunov exponents for systems with periodic orbit gluing property.Discrete Contin. Dyn. Syst.(2)39(2019), 1019-1032

work page 2019
[56]

Ures, Intrinsic ergodicity of partially hyperbolic diffeomorphisms with a hyper- bolic linear part.Proc

R. Ures, Intrinsic ergodicity of partially hyperbolic diffeomorphisms with a hyper- bolic linear part.Proc. Amer . Math. Soc.140(6) (2012), 1973–1985

work page 2012
[57]

Walters, Equilibrium states forβ-transformations and related transformations

P . Walters, Equilibrium states forβ-transformations and related transformations. Math. Z.159(1) (1978), 65–88

work page 1978
[58]

Walters, An Introduction to Ergodic Theory (Graduate Texts in Mathematics 79)

P . Walters, An Introduction to Ergodic Theory (Graduate Texts in Mathematics 79). Springer, New York, 1982

work page 1982
[59]

Yang and J

D. Yang and J. Zhang, Non-hyperbolic ergodic measures and horseshoes in partially hyperbolic homoclinic classes.J. Inst. Math. Jussieu19(5) (2020), 1765–1792

work page 2020
[60]

Zhao and E

C. Zhao and E. Chen, On the topological pressure of the saturated set with non- uniform structure.Topol. Methods Nonlinear Anal.51(1) (2018), 313–329. 42

work page 2018

[1] [1]

E. M. Alfsen, Compact Convex Sets and Boundary Integrals. Ergebnisse der Math- ematik und ihrer Grenzgebiete, Band 57, Springer-Verlag, New York-Heidelberg, 1971

work page 1971

[2] [2]

Bárány, T

B. Bárány, T . Jordan, A. Käenmäki and M. Rams, Birkhoff and Lyapunov spectra on planar self-affine sets.Int. Math. Res. Not. IMRN(10)2021(2021), 7966-8005

work page 2021

[3] [3]

Barreira and B

L. Barreira and B. Saussol, Variational principles and mixed multifractal spectra. Trans. Amer . Math. Soc.353(2001), 3919-3944

work page 2001

[4] [4]

Barreira and C

L. Barreira and C. Holanda, Almost additive multifractal analysis for flows.Nonlin- earity34(6) (2021), 4283–4314

work page 2021

[5] [5]

Bochi, A

J. Bochi, A. Katok and F . Rodriguez Hertz, Flexibility of Lyapunov exponents.Ergod. Th. & Dynam. Sys.(2)42(2022), 554-591

work page 2022

[6] [6]

Bowen, Topological entropy for noncompact sets,Trans

R. Bowen, Topological entropy for noncompact sets,Trans. Amer . Math. Soc.184 (1973), 125–136

work page 1973

[7] [7]

Bowen, Some systems with unique equilibrium states.Math

R. Bowen, Some systems with unique equilibrium states.Math. Systems Theory8 (3) (1974), 193–202

work page 1974

[8] [8]

Bowen, Equilibrium states and the ergodic theory of Anosov diffeomorphisms, second revised edition

R. Bowen, Equilibrium states and the ergodic theory of Anosov diffeomorphisms, second revised edition. Lecture Notes in Mathematics, 470, Springer, Berlin, 2008

work page 2008

[9] [9]

Burguet, Topological and almost Borel universality for systems with the weak specification property.Ergod

D. Burguet, Topological and almost Borel universality for systems with the weak specification property.Ergod. Th. & Dynam. Sys.(8)40(2020), 2098–2115

work page 2020

[10] [10]

Chandgotia and T

N. Chandgotia and T . Meyerovitch, Borel subsystems and ergodic universality for compactZ d -systems via specification and beyond.Proc. Lond. Math. Soc.(3)123 (2021), 231–312

work page 2021

[11] [11]

Climenhaga and D

V . Climenhaga and D. J. Thompson, Equilibrium states beyond specification and the Bowen property.J. Lond. Math. Soc.(2)87(2013), 401–427

work page 2013

[12] [12]

Climenhaga, Topological pressure of simultaneous level sets.Nonlinearity(1)26 (2013), 241–268

V . Climenhaga, Topological pressure of simultaneous level sets.Nonlinearity(1)26 (2013), 241–268

work page 2013

[13] [13]

Climenhaga, D

V . Climenhaga, D. J. Thompson and K. Yamamoto, Large deviations for systems with non-uniform structure.Trans. Amer . Math. Soc.369(6) (2017), 4167–4192

work page 2017

[14] [14]

Denker, C

M. Denker, C. Grillenberger and K. Sigmund, Ergodic Theory on Compact Spaces. Lecture Notes in Mathematics 527, Springer-Verlag, Berlin-Heidelberg, 1976

work page 1976

[15] [15]

L. J. Díaz, K. Gelfert and M. Rams, Entropy spectrum of Lyapunov exponents for nonhyperbolic step skew-products and elliptic cocycles.Comm. Math. Phys.(2)367 (2019), 351-416. 39

work page 2019

[16] [16]

Y. Dong, X. Hou and X. Tian, Twelve different statistical future of dynamical orbits: Empty syndetic center. arXiv:1701.01910

work page arXiv

[17] [17]

Y. Dong, X. Hou and X.Tian, Abundance of Smale’ s horseshoes and ergodic measures via multifractal analysis and various quantitative spectrums. ArXiv: 2207.02403

work page arXiv

[18] [18]

Fan, Multifractal analysis of weighted ergodic averages.Adv

A. Fan, Multifractal analysis of weighted ergodic averages.Adv. Math.337(2021), Paper No. 107488, 34 pp

work page 2021

[19] [19]

Gelfert and D

K. Gelfert and D. Kwietniak, On density of ergodic measures and generic points. Ergod. Th. & Dynam. Sys.38(5) (2018), 1745–1767

work page 2018

[20] [20]

K. R. Goodearl, Partially Ordered Abelian Groups with Interpolation. Mathematical Surveys and Monographs 20, American Mathematical Society, Providence, RI, 2010

work page 2010

[21] [21]

L. Guan, P . Sun and W . Wu, Measures of intermediate entropies and homogeneous dynamics.Nonlinearity30(9) (2017), 3349–3361

work page 2017

[22] [22]

Y. M. He and C. Wolf, Entropy spectrum of rotation classes.J. Math. Anal. Appl.508 (1) (2022), 125851

work page 2022

[23] [23]

Hou and X

X. Hou and X. Tian, Conditional intermediate entropy and Birkhoff average prop- erties of hyperbolic flows.Ergod. Th. & Dynam. Sys.(8)44, (2024), 2257-C2288

work page 2024

[24] [24]

X. Hou, X. Tian and Y. Yuan, The growth of periodic orbits with large support. Nonlinearity36(6) (2023), 2975–3005

work page 2023

[25] [25]

Huang, L

W . Huang, L. Xu and S. Xu, Ergodic measures of intermediate entropy for affine transformations of nilmanifolds.Electron. Res. Arch.29(2021), 2819-2827

work page 2021

[26] [26]

Iommi and T

G. Iommi and T . Jordan, Multifractal analysis for quotients of Birkhoff sums for countable Markov maps.Int. Math. Res. Not. IMRN2015, no. 2, 460–498

work page

[27] [27]

Jaerisch and H

J. Jaerisch and H. Takahasi, Mixed multifractal spectra of Birkhoff averages for non-uniformly expanding one-dimensional Markov maps with countably many branches.Adv. Math.385(2021), Paper No. 107778, 45 pp

work page 2021

[28] [28]

Jenkinson, Rotation, entropy, and equilibrium states.Trans

O. Jenkinson, Rotation, entropy, and equilibrium states.Trans. Amer . Math. Soc. 353(9) (2001), 3713–3739

work page 2001

[29] [29]

Jenkinson, Ergodic optimization.Discrete Contin

O. Jenkinson, Ergodic optimization.Discrete Contin. Dyn. Syst. Ser . A15(1) (2006), 197–224

work page 2006

[30] [30]

Johansson, T

A. Johansson, T . M. Jordan, A. Öberg and M. Pollicott, Multifractal analysis of non- uniformly hyperbolic systems.Israel J. Math.177(2010), 125–144

work page 2010

[31] [31]

Jordan and M

T . Jordan and M. Rams, Birkhoff spectrum for piecewise monotone interval maps. Fund. Math.252(2) (2021), 203–223. 40

work page 2021

[32] [32]

Katok, Lyapunov exponents, entropy and periodic orbits for diffeomorphisms

A. Katok, Lyapunov exponents, entropy and periodic orbits for diffeomorphisms. Publ. Math. Inst. Hautes Études Sci.51(1980), 137-174

work page 1980

[33] [33]

Konieczny, M

J. Konieczny, M. Kupsa and D. Kwietniak, Arcwise connectedness of the set of er- godic measures of hereditary shifts.Proc. Amer . Math. Soc.146(8) (2018), 3425– 3438

work page 2018

[34] [34]

Kucherenko and A

T . Kucherenko and A. N. Quas, Flexibility of the pressure function.Comm. Math. Phys.(2)395(2022), 1431–1461

work page 2022

[35] [35]

Kucherenko and C

T . Kucherenko and C. Wolf, Geometry and entropy of generalized rotation sets. Israel J. Math.199(2) (2014), 791–829

work page 2014

[36] [36]

A. J. Lazar, Spaces of affine continuous functions on simplexes,Trans. Amer . Math. Soc.134(1968), 503–525

work page 1968

[37] [37]

M. Li, Y. Shi, S. Wang and X. Wang, Measures of intermediate entropies for star vector fields.Israel J. Math.240(2020), 791-819

work page 2020

[38] [38]

Li and P

J. Li and P . Oprocha, Properties of invariant measures in dynamical systems with the shadowing property.Ergod. Th. & Dynam. Sys.38(6) (2018), 2257–2294

work page 2018

[39] [39]

Lind and B

D. Lind and B. Marcus, An Introduction to Symbolic Dynamics and Coding. Cam- bridge University Press, Cambridge, 1995

work page 1995

[40] [40]

Liu and X

N. Liu and X. Liu, On the variational principle for a class of skew product transfor- mations.J. Differential Equations442(2025), 113498

work page 2025

[41] [41]

I. D. Morris, Ergodic optimization for generic continuous functions.Discrete Con- tin. Dyn. Syst. Ser . A27(1) (2010), 383–388

work page 2010

[42] [42]

Parry and M

W . Parry and M. Pollicott, Zeta Functions and the Periodic Orbit Structure of Hy- perbolic Dynamics. Astérisque (1990), 187–188

work page 1990

[43] [43]

Y. B. Pesin, Dimension Theory in Dynamical Systems: Contemporary Views and Ap- plications. Chicago Lectures in Mathematics, University of Chicago Press, Chicago, 1997

work page 1997

[44] [44]

Ya. B. Pesin and V . Sadovskaya, Multifractal analysis of conformal Axiom A flows. Comm. Math. Phys.216(2) (2001), 277–312

work page 2001

[45] [45]

Pfister and W

C.-E. Pfister and W . G. Sullivan, On the topological entropy of saturated sets,Ergodic Theory Dynam. Systems27(2007), no. 3, 929–956

work page 2007

[46] [46]

R. R. Phelps, Lectures on Choquet’ s Theorem. Second edition, Lecture Notes in Mathematics 1757, Springer, Berlin, 2001

work page 2001

[47] [47]

R. R. Phelps, Unique equilibrium states, inDynamics and randomness (Santiago, 2002),219–225, Nonlinear Phenom. Complex Systems, 7, Kluwer Acad. Publ., Dor- drecht. 41

work page 2002

[48] [48]

Qiu, Existence and uniqueness of SRB measure onC 1 generic hyperbolic attrac- tors.Comm

H. Qiu, Existence and uniqueness of SRB measure onC 1 generic hyperbolic attrac- tors.Comm. Math. Phys.(2)302(2011), 345-357

work page 2011

[49] [49]

Quas and T

A. Quas and T . Soo, Ergodic universality of some topological dynamical systems. Trans. Amer . Math. Soc.368(2016), 4137-4170

work page 2016

[50] [50]

R. T . Rockafellar,Convex Analysis, Princeton Mathematical Series, No. 28, Princeton University Press, Princeton, 1970

work page 1970

[51] [51]

Ruelle, Thermodynamic formalism, second edition

D. Ruelle, Thermodynamic formalism, second edition. Cambridge Mathematical Library, Cambridge Univ. Press, Cambridge, 2004

work page 2004

[52] [52]

Shinoda, Uncountably many maximizing measures for a dense subset of con- tinuous functions.Nonlinearity31(5) (2018), 2192–2200

M. Shinoda, Uncountably many maximizing measures for a dense subset of con- tinuous functions.Nonlinearity31(5) (2018), 2192–2200

work page 2018

[53] [53]

Sigmund, Generic properties of invariant measures for Axiom A diffeomor- phisms,Invent

K. Sigmund, Generic properties of invariant measures for Axiom A diffeomor- phisms,Invent. Math.11(1970), 99–109

work page 1970

[54] [54]

Sun, Ergodic measures of intermediate entropies for dynamical systems with the approximate product property.Adv

P . Sun, Ergodic measures of intermediate entropies for dynamical systems with the approximate product property.Adv. Math.465(2025), 110159

work page 2025

[55] [55]

X. Tian, S. Wang and X. Wang, Intermediate Lyapunov exponents for systems with periodic orbit gluing property.Discrete Contin. Dyn. Syst.(2)39(2019), 1019-1032

work page 2019

[56] [56]

Ures, Intrinsic ergodicity of partially hyperbolic diffeomorphisms with a hyper- bolic linear part.Proc

R. Ures, Intrinsic ergodicity of partially hyperbolic diffeomorphisms with a hyper- bolic linear part.Proc. Amer . Math. Soc.140(6) (2012), 1973–1985

work page 2012

[57] [57]

Walters, Equilibrium states forβ-transformations and related transformations

P . Walters, Equilibrium states forβ-transformations and related transformations. Math. Z.159(1) (1978), 65–88

work page 1978

[58] [58]

Walters, An Introduction to Ergodic Theory (Graduate Texts in Mathematics 79)

P . Walters, An Introduction to Ergodic Theory (Graduate Texts in Mathematics 79). Springer, New York, 1982

work page 1982

[59] [59]

Yang and J

D. Yang and J. Zhang, Non-hyperbolic ergodic measures and horseshoes in partially hyperbolic homoclinic classes.J. Inst. Math. Jussieu19(5) (2020), 1765–1792

work page 2020

[60] [60]

Zhao and E

C. Zhao and E. Chen, On the topological pressure of the saturated set with non- uniform structure.Topol. Methods Nonlinear Anal.51(1) (2018), 313–329. 42

work page 2018