Dense chaos for continuous interval maps

Abstract

A continuous map f from a compact interval I into itself is densely (resp. generically) chaotic if the set of points (x,y) such that n+∞|fn(x)-fn(y)|>0 and n+∞ |fn(x)-fn(y)|=0 is dense (resp. residual) in I× I. We prove that if the interval map f is densely but not generically chaotic then there is a descending sequence of invariant intervals, each of which containing a horseshoe for f2. It implies that every densely chaotic interval map is of type at most 6 for Sharkovsky's order (that is, there exists a periodic point of period 6), and its topological entropy is at least 2/2. We show that equalities can be realised.