Thursday, May 1, 2025 4:00 pm
-
5:00 pm
EDT (GMT -04:00)
Joaco Prandi, University of Waterloo
Bounding the Local Dimension of the Convolution of Measures
Let mu be a finite measure on a metric space X. Then the local dimension of the measure mu at the point x in the support of mu is given by
dim_{loc}mu(x)=lim_r ln(B(x,r))}\ln(r)
In a sense, dim_{loc}mu(x) represents how much mass there is around the point x. The bigger the local dimension, the less mass there is. In this talk, we will explore how the local dimension of the convolution of two measures mu and nu can be bounded by the local dimension of one of the measures. This is based on joint work with Kevin Hare.
MC5417