Arithmetic on Moran sets

Abstract

Let (M, ck,nk) be a class of Moran sets. We assume that the convex hull of any E∈ (M, ck,nk) is [0,1]. Let A,B be two non-empty sets in R. Suppose that f is a continuous function defined on an open set U⊂ R2. Denote the continuous image of f by equation* fU(A,B)=\f(x,y):(x,y)∈ (A× B) U\. equation* In this paper, we prove the following result. Let E1,E2∈(M, ck, nk). If there exists some (x0,y0)∈ (E1× E2) U such that k≥ 1\1-cknk\< ∂ yf|(x0,y0)∂ xf|(x0,y0) <∈fk≥ 1\ck1-nkck\, then fU(E1, E2) contains an interior.