Fractional susceptibility functions for the quadratic family: Misiurewicz-Thurston parameters

Abstract

For the quadratic family, we define the two-variable (η and z) fractional susceptibility function associated to a C1 observable at a stochastic map. We also define an approximate, "frozen" fractional susceptibility function. If the parameter is Misiurewicz-Thurston, we show that the frozen susceptibility function has a pole at z=1 for generic observables if a "one-half" transversality condition holds. We introduce "Whitney" fractional integrals and derivatives on suitable sets . We formulate conjectures supported by our results on the frozen susceptibility function and numerical experiments. In particular, we expect that the fractional susceptibility function for η=1/2 is singular at z=1 for Collet-Eckmann maps and generic observables. We view this work as a step towards the resolution of the paradox that the classical susceptibility function is holomorphic at z=1 for Misiurewicz-Thurston maps, despite lack of linear response.