| Convolutions of Cantor measures without resonance (2009) | |||||||||||
Abstract | |||||||||||
| Denote by $\mu_a$ the distribution of the random sum $(1-a) \sum_{j=0}^\infty \omega_j a^j$, where $P(\omega_j=0)=P(\omega_j=1)=1/2$ and all the choices are independent. For $0 | |||||||||||
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