A separation property for iterated function systems of similitudes

Abstract

Let E be the attractor of an iterated function system \φi(x)= Rix+ai\i=1N on Rd, where 0<<1, ai∈ Rd and Ri are orthogonal transformations on Rd. Suppose that \φi\i=1N satisfies the open set condition, but not the strong separation condition. We show that E can not be generated by any iterated function system of similitudes satisfying the strong separation condition. This gives a partial answer to a folklore question about the separation conditions on the generating iterated function systems of self-similar sets.