A nonlinear version of the Newhouse thickness theorem

Abstract

Let C1 and C2 be two Cantor sets with convex hull [0,1]. Newhouse proved if τ(C1)· τ(C2)≥ 1, then the arithmetic sum C1+C2 is an interval, where τ(Ci), 1≤ i≤ 2 denotes the thickness of Ci. In this paper, we generalize this thickness theorem as follows. Let Ki⊂ R, i=1,·s, d, be some Cantor sets (perfect and nowhere dense) with convex hull [0,1]. Suppose f(x1,·s, xd-1,z)∈ C1 is a continuous function defined on Rd. Denote the continuous image of f by f(K1,·s, Kd)=\f(x1, ·s xd-1,z):xi∈ Ki,z∈ Kd, 1≤ i≤ d-1\. If for any (x1, ·s, xd-1,z)∈ [0,1]d, we have (τ(Ki))-1≤ |∂xi f∂z f|≤ τ(Kd),1≤ i≤ d-1 then f(K1,·s, Kd) is a closed interval. We give two applications. Firstly, we partially answer some questions posed by Takahashi. Secondly, we obtain various nonlinear identities, associated with the continued fractions with restricted partial quotients, which can represent real numbers.