Resonance between Cantor sets

Abstract

Let Ca be the central Cantor set obtained by removing a central interval of length 1-2a from the unit interval, and continuing this process inductively on each of the remaining two intervals. We prove that if b/ a is irrational, then \[ (Ca+Cb) = ((Ca) + (Cb),1), \] where is Hausdorff dimension. More generally, given two self-similar sets K,K' in and a scaling parameter s>0, if the dimension of the arithmetic sum K+sK' is strictly smaller than (K)+(K') 1 (``geometric resonance''), then there exists r<1 such that all contraction ratios of the similitudes defining K and K' are powers of r (``algebraic resonance''). Our method also yields a new result on the projections of planar self-similar sets generated by an iterated function system that includes a scaled irrational rotation.