Convolutions of Cantor Measures Without Resonance
- Fedor Nazarov ,
- Yuval Peres ,
- Pablo Shmerkin
Israel Journal of Mathematics | , Vol 187: pp. 93-116
Denote by \({\mu }_a\) the distribution of the random sum \((1-a){\sum }_{\infty }^{j=0}{\omega }_ja_j\), where \(P({\omega }_j=0)=P({\omega }_j=1)=1/2\) and all the choices are independent. For \(0<a<1/2\), the measure \({\mu }_a\) is supported on \(C_a\), the central Cantor set obtained by starting with the closed united interval, removing an open central interval of length \((1-2a)\), and iterating this process inductively on each of the remaining intervals. We investigate the convolutions \({\mu }_a\ast ({\mu }_b\circ S_{-1}^{\lambda })\), where \(S_{\lambda }(x)=\lambda x\) is a rescaling map. We prove that if the ratio \(logb/loga\) is irrational and \(\lambda \neq 0\), then