Thick hyperbolic repelling invariant Cantor set and wild attractor

Abstract

Let D be the set of β ∈ (1, 2] such that fβ is a symmetric tent map with finite critical orbit. For β ∈ D, by operating Denjoy like surgery on fβ, we constructed a C1 unimodal map gβ admitting a thick hyperbolic repelling invariant Cantor set which contains a wild Cantor attractor. The smoothness of gβ is ensured by the effective estimation of the preimages of the critical point as well as the prescribed lengths of the inserted intervals. Furthermore, D is dense in (1, 2], and gβ can not be C1+α because the hyperbolic repelling invariant Cantor set of C1+α map has Lebesgue measure equal to zero.