Linear response theory for diffeomorphisms with tangencies of stable and unstable manifolds. [A contribution to the Gallavotti-Cohen chaotic hypothesis.]

Abstract

This note presents a non-rigorous study of the linear response for an SRB (or `natural physical') measure of a diffeomorphism f in the presence of tangencies of the stable and unstable manifolds of . We propose that generically, if has no zero Lyapunov exponent, if its stable dimension is sufficiently large (greater than 1/2 or perhaps 3/2) and if it is exponentially mixing in a suitable sense, then the following formal expression for the first derivative of (φ) with respect to f along X is convergent: (z)=Σn=0∞ zn∫(dx)\,X(x)·∇x(φ fn) for z=1 This suggests that an SRB measure may exist for small perturbations of f, with weak differentiability.