Trigonometric series and self-similar sets

Abstract

Let F be a self-similar set on R associated to contractions fj(x) = rj x + bj, j ∈ A, for some finite A, such that F is not a singleton. We prove that if ri / rj is irrational for some i ≠ j, then F is a set of multiplicity, that is, trigonometric series are not in general unique in the complement of F. No separation conditions are assumed on F. We establish our result by showing that every self-similar measure μ on F is a Rajchman measure: the Fourier transform μ() 0 as || ∞. The rate of μ() 0 is also shown to be logarithmic if ri / rj is diophantine for some i ≠ j. The proof is based on quantitative renewal theorems for stopping times of random walks on R.