English

Linear response for intermittent maps

Dynamical Systems 2016-12-06 v3 Chaotic Dynamics

Abstract

We consider the one parameter family αTα\alpha \mapsto T_\alpha (α[0,1)\alpha \in [0,1)) of Pomeau-Manneville type interval maps Tα(x)=x(1+2αxα)T_\alpha(x)=x(1+2^\alpha x^\alpha) for x[0,1/2)x \in [0,1/2) and Tα(x)=2x1T_\alpha(x)=2x-1 for x[1/2,1]x \in [1/2, 1], with the associated absolutely continuous invariant probability measure μα\mu_\alpha. For α(0,1)\alpha \in (0,1), Sarig and Gou\"ezel proved that the system mixes only polynomially with rate n11/αn^{1-1/\alpha} (in particular, there is no spectral gap). We show that for any ψLq\psi\in L^q, the map α01ψdμα\alpha \to \int_0^1 \psi\, d\mu_\alpha is differentiable on [0,11/q)[0,1-1/q), and we give a (linear response) formula for the value of the derivative. This is the first time that a linear response formula for the SRB measure is obtained in the setting of slowly mixing dynamics. Our argument shows how cone techniques can be used in this context. For α1/2\alpha \ge 1/2 we need the n1/αn^{-1/\alpha} decorrelation obtained by Gou\"ezel under additional conditions.

Cite

@article{arxiv.1508.02700,
  title  = {Linear response for intermittent maps},
  author = {V. Baladi and M. Todd},
  journal= {arXiv preprint arXiv:1508.02700},
  year   = {2016}
}

Comments

Minor typos corrected. To appear in Comm. Math. Phys

R2 v1 2026-06-22T10:31:27.347Z