Dimension Estimates for Non-conformal Repellers and Continuity of Sub-additive Topological Pressure

Abstract: Given a non-conformal repeller Λ of a C 1+γ map, we study the Hausdorff dimension of the repeller and continuity of the sub-additive topological pressure for the sub-additive singular valued potentials. Such a potential always possesses an equilibrium state. We then use a substantially modified version of Katok's approximating argument, to construct a compact invariant set on which the corresponding dynamical quantities (such as Lyapunov exponents and metric entropy) are close to that of the equilibrium measur… Show more

“…An A-invariant sub-bundle F ⊂ E is α-Hölder if and only if it is H s/u -invariant.Remark 6. While [2, Corollary 3.5] is stated for fiber-bunched cocycles, the same result holds for α-Hölder cocycles whose canonical holonomies converge and are α-Hölder continuous, including α-Hölder cocycles satisfying(8). Moreover, Proposition 3 and 4 readily extend to our setting where the base dynamical system is a mixing subshift of finite type (Σ T , σ).…”

“…This implies the continuity of the pressure P(Φ A ) and the equilibrium state µ A restricted to the set of weakly typical cocycles U w ; see [16,Theorem B]. In this direction of results, we remark that Cao, Pesin, and Zhao [8] recently established a more general result that the map A → P(Φ A ) is continuous on C α (Σ T , GL d (R)) using a different approach. See also [12].…”

Thermodynamic formalism of \text{GL}_2(\mathbb{R}) -cocycles with canonical holonomies

“…An A-invariant sub-bundle F ⊂ E is α-Hölder if and only if it is H s/u -invariant.Remark 6. While [2, Corollary 3.5] is stated for fiber-bunched cocycles, the same result holds for α-Hölder cocycles whose canonical holonomies converge and are α-Hölder continuous, including α-Hölder cocycles satisfying(8). Moreover, Proposition 3 and 4 readily extend to our setting where the base dynamical system is a mixing subshift of finite type (Σ T , σ).…”

“…This implies the continuity of the pressure P(Φ A ) and the equilibrium state µ A restricted to the set of weakly typical cocycles U w ; see [16,Theorem B]. In this direction of results, we remark that Cao, Pesin, and Zhao [8] recently established a more general result that the map A → P(Φ A ) is continuous on C α (Σ T , GL d (R)) using a different approach. See also [12].…”

Thermodynamic formalism of \text{GL}_2(\mathbb{R}) -cocycles with canonical holonomies

“…Cao, Pesin, and Zhao [CPZ18] recently proved a result that implies Theorem B (1). See Section 3 for further comments.…”

Quasi-multiplicativity of Typical Cocycles

“…The subadditive topological pressure has been proven to be essential to estimate the lower bound of the Hausdorff dimension of non-conformal repellers in the deterministic dynamical systems [32]. Thus, it should be asked if there exists a random version of pre-image thermodynamic formalism for subadditive sequences of potentials, which might have some potential applications in the study of multifractal analysis of non-conformal random dynamical systems.…”

Subadditive Pre-Image Variational Principle for Bundle Random Dynamical Systems