On the spectra of Cantor measures

Abstract

We consider Cantor measures on the line, with contraction factor N-1=p-α (where p a positive prime, α a positive integer) and m positive integer digits lying in distinct residue classes modulo N. We obtain a complete characterization of maximal orthogonal sets of exponentials in L2(μ), for a class of such measures μ. It is proved that the n+1-th digit in the base-N expansion of frequencies in a maximal orthogonal set, with the first n digits prescribed, has m possible values. In consequence, there are a correspondence between labelings of the m-homogeneous rooted tree and maximal orthogonal sets of frequencies.