Date:
Thu, 23/06/202214:30-15:30
Title: Dimension theory of self-affine measures in R^d
Abstract: A self-affine measure is a stationary measure for a random walk on R^d which is generated by finitely many contracting affine maps. Self-affine measures are among the most studied and well-known fractal objects. When d = 1 or 2 their dimension theory is relatively well understood. When d >= 3 much less is known. I will present new results in higher dimensions.
Live broadcast/recording link: https://huji.cloud.panopto.eu/Panopto/Pages/Viewer.aspx?id=c288f619-1283...
Abstract: A self-affine measure is a stationary measure for a random walk on R^d which is generated by finitely many contracting affine maps. Self-affine measures are among the most studied and well-known fractal objects. When d = 1 or 2 their dimension theory is relatively well understood. When d >= 3 much less is known. I will present new results in higher dimensions.
Live broadcast/recording link: https://huji.cloud.panopto.eu/Panopto/Pages/Viewer.aspx?id=c288f619-1283...