Polina Vytnova scite author profile

Polina Vytnova

3Publications

64Citation Statements Received

99Citation Statements Given

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Coventry (United Kingdom), University of Warwick, University of Surrey

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Linear response and periodic points

Pollicott

Vytnova

2016

Nonlinearity

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Abstract. Given an expanding map of the interval we can associate an absolutely continuous measure. Given an Anosov transformation on a two torus we can associate a Sinai-Ruelle-Bowen measure. In this note we consider first and second derivatives of the change in the average of a reference function. We present an explicit convergent series for these derivatives. In particular, this gives a relatively simple method of computation.

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Rigorous Computation of Diffusion Coefficients for Expanding Maps

2017

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For real analytic expanding interval maps, a novel method is given for rigorously approximating the diffusion coefficient of real analytic observables. As a theoretical algorithm, our approximation scheme is shown to give quadratic exponential convergence to the diffusion coefficient. The method for converting this rapid convergence into explicit high precision rigorous bounds is illustrated in the setting of Lanford's map x → 2x + 1 2 x(1 − x) (mod 1).

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How Many Inflections are There in the Lyapunov Spectrum?

Jenkinson

Pollicott

Vytnova

2021

Commun. Math. Phys.

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Iommi and Kiwi (J Stat Phys 135:535–546, 2009) showed that the Lyapunov spectrum of an expanding map need not be concave, and posed various problems concerning the possible number of inflection points. In this paper we answer a conjecture in Iommi and Kiwi (2009) by proving that the Lyapunov spectrum of a two branch piecewise linear map has at most two points of inflection. We then answer a question in Iommi and Kiwi (2009) by proving that there exist finite branch piecewise linear maps whose Lyapunov spectra have arbitrarily many points of inflection. This approach is used to exhibit a countable branch piecewise linear map whose Lyapunov spectrum has infinitely many points of inflection.

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Polina Vytnova

Linear response and periodic points

Rigorous Computation of Diffusion Coefficients for Expanding Maps

How Many Inflections are There in the Lyapunov Spectrum?

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