Intersections of Cantor sets with hyperbolas and continuous images

Abstract

Given λ∈ (0,1/2), let equation* Cλ=(1-λ)Σi=1∞ diλi-1:di∈0,1 equation* be the middle Cantor sets with convex hull [0, 1]. We are interested in the set St=(x,y)∈ Cλ× Cλ: xy=t, where t∈[0,1]. Since the cases where t=0 or t=1 are trivial, we assume that t∈(0,1) in what follows. We show that there exists a λ0=0.4302 such that for all λ satisfying λ0 λ < 1/2, the set St has the cardinality of the continuum for every t ∈ (0,1). Besides, we further investigate the continuous image of Cλ× Cλ, that is, for any given 2 k∈ , we give a sufficient condition for set xky:x,y∈ Cλ to be the interval [0,1]. Our observations reveal that the behavior exhibited by the image of the function fk(x,y)=xky is complex and depends on the parameters k and λ.