Sturmian maximizing measures for the piecewise-linear cosine family

Anagnostopoulou, Vasso; Díaz-Ordaz, Karla; Jenkinson, Oliver; Richard, C.

doi:10.1007/s00574-012-0013-3

Cited by 8 publications

(23 citation statements)

References 44 publications

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“…We point out the interesting papers [1,9] where an estimation of the support of the maximizing probability is obtained for a certain class of potentials [but not using the approach described by (3)].…”

Section: Definitionmentioning

confidence: 99%

Explicit examples in ergodic optimization

Ferreira

Lopes

Oliveira

2020

São Paulo J. Math. Sci.

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Denote by T the transformation T(x) = 2 x (mod 1). Given a potential A ∶ S 1 → ℝ we are interested in exhibiting in several examples the explicit expression for the calibrated subaction V ∶ S 1 → ℝ for A. The action of the 1/2 iterative procedure G , acting on continuous functions f ∶ S 1 → ℝ , was analyzed in a companion paper. Given an initial condition f 0 , the sequence, G n (f 0) will converge to a subaction. The sharp numerical evidence obtained from this iteration allow us to guess explicit expressions for the subaction in several worked examples: among them for A(x) = sin 2 (2 x) and A(x) = sin(2 x). Here, among other things, we present piecewise analytical expressions for several calibrated subactions. The iterative procedure can also be applied to the estimation of the joint spectral radius of matrices. We also analyze the iteration of G when the subaction is not unique. Moreover, we briefly present the version of the 1/2 iterative procedure for the estimation of the main eigenfunction of the Ruelle operator.

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Section: Definitionmentioning

confidence: 99%

Explicit examples in ergodic optimization

Ferreira

Lopes

Oliveira

2020

São Paulo J. Math. Sci.

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“…Yet another approach to non-convergence in the zero temperature limit has been introduced by Coronel & Rivera-Letelier [53], partially based on the methods of [154], establishing a certain persistence of the non-convergence phenomenon: 3 The paper [37] uses ideas from analytic geometry (semi-algebraic and sub-analytic maps) which are outside the standard toolkit of most ergodic theorists, and despite its elegant brevity, the approach of [37] has not subsequently been pursued. 4 It was noted in [46] that van Enter & Ruszel [154] had already given an example of non-convergence in the zero temperature limit, albeit in a somewhat different context: a nearest neighbour potential model with the shift map acting on a subset of (R/Z) Z , the significant difference being that the state space R/Z is non-discrete.…”

Section: Ergodic Optimization As Zero Temperature Thermodynamic Formamentioning

confidence: 99%

Ergodic optimization in dynamical systems

Jenkinson¹

2018

Ergod. Th. Dynam. Sys.

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Abstract. Ergodic optimization is the study of problems relating to maximizing orbits and invariant measures, and maximum ergodic averages. An orbit of a dynamical system is called f -maximizing if the time average of the real-valued function f along the orbit is larger than along all other orbits, and an invariant probability measure is called fmaximizing if it gives f a larger space average than any other invariant probability measure. In this paper, we consider the main strands of ergodic optimization, beginning with an influential model problem, and the interpretation of ergodic optimization as the zero temperature limit of thermodynamic formalism. We describe typical properties of maximizing measures for various spaces of functions, the key tool of adding a coboundary so as to reveal properties of these measures, as well as certain classes of functions where the maximizing measure is known to be Sturmian.

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“…For example, let, as above, T be the doubling map, and let g θ (x) = cos 2π(x − θ ) or f θ (x) = 1 − 4dist T (x, θ ), where dist T is the distance on the circle R/Z. In both cases maximizing measures are Sturmian -see [3,1] and references therein.…”

Section: Maximizing Measuresmentioning

confidence: 99%

“…Consequently, ρ(A ) = (ρ(A 0 A 1 )) 1/2 = (1 + √ 5)/2. 1]. Is it true that for any fixed α any maximizing sequence is "essentially periodic" like in the case α = 1?…”

Section: Joint Spectral Radiusmentioning

confidence: 99%