On the fractional susceptibility function of piecewise expanding maps

Abstract

We associate to a perturbation (ft) of a (stably mixing) piecewise expanding unimodal map f0 a two-variable fractional susceptibility function φ(η, z), depending also on a bounded observable φ. For fixed η ∈ (0,1), we show that the function φ(η, z) is holomorphic in a disc Dη⊂ C centered at zero of radius >1, and that φ(η, 1) is the Marchaud fractional derivative of order η of the function t Rφ(t):=∫ φ(x)\, dμt, at t=0, where μt is the unique absolutely continuous invariant probability measure of ft. In addition, we show that φ(η, z) admits a holomorphic extension to the domain \ (η, z) ∈ C2 0< η <1, \, z ∈ Dη \. Finally, if the perturbation (ft) is horizontal, we prove that η 1φ(η, 1)=∂t Rφ(t)|t=0.