Summability implies Collet-Eckmann almost surely

Abstract

We provide a strengthened version of the famous Jakobson's theorem. Consider an interval map f satisfying a summability condition. For a generic one-parameter family ft of maps with f0=f, we prove that t=0 is a Lebesgue density point of the set of parameters for which ft satisfies both the Collect-Eckmann condition and a strong polynomial recurrence condition.