- Date: 2012-04-13 [14:30]
- Auteur: Karma Dajani (Univ. d'Utrecht (Pays-Bas))
- Titre: Random expansions, Bernoulli convolutions and local dimensions
(Exposť en anglais - Talk in English)
The infinite Bernoulli convolution is a probability measure obtained by convolving infinitely many Bernoulli measures. This measure can be seen as the marginal distribution of the measure of maximal entropy for the random $\beta$ transformation. In this talk we will explain this relationship and show how this leads to a better understanding of the local behavior of the Bernoulli convolution.
email de l'auteur: k (point) dajani1 (at) uu (point) nl