Abstract: A result of Benjamini and Schramm shows that the Hausdorff dimension of sets in 1-dim
random geometry given by multiplicative cascades satisfies an elegant formula that depends only
on the random variable and the dimension of the set in Euclidean geometry. In this talk, we show
that this holds for the box-counting dimension when the set is sufficiently regular. This formula,
however, is not valid in general, and we provide bounds on the dimension in the random metric.
We will also show that there is no hope for an exact formula through a surprisingly simple family
of countable sets. These examples show that the dimension with the random metric depends on more
structural information and that there cannot be a KPZ equation for the box-counting dimension.
(Joint with Kenneth Falconer)
The box-counting dimension in one-dimensional random geometry of multiplicative cascades
23.02.2024 14:15 - 15:15
Organiser:
H. Bruin, R. Zweimüller
Location:
BME Budapest