Multiplication on self-similar sets with overlaps
Abstract
Let A,B⊂R. Define A· B=\x· y:x∈ A, y∈ B\. In this paper, we consider the following class of self-similar sets with overlaps. Let K be the attractor of the IFS \f1(x)=λ x, f2(x)=λ x+c-λ,f3(x)=λ x+1-λ\, where f1(I) f2(I)≠ , (f1(I) f2(I)) f3(I)=, and I=[0,1] is the convex hull of K. The main result of this paper is K· K=[0,1] if and only if (1-λ)2≤ c. Equivalently, we give a necessary and sufficient condition such that for any u∈[0,1], u=x· y, where x,y∈ K.
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