Hausdorff dimension of planar self-affine sets and measures with overlaps

Michael Hochman; Ariel Rapaport

doi:10.4171/jems/1127

JournalsjemsVol. 24, No. 7pp. 2361–2441

Hausdorff dimension of planar self-affine sets and measures with overlaps

Michael Hochman
The Hebrew University of Jerusalem, Israel; Institute for Advanced Study, Princeton, USA
Ariel Rapaport
Cambridge University, UK; The Hebrew University of Jerusalem, Israel; Technion, Haifa, Israel

Download PDF

This article is published open access under our Subscribe to Open model.

Abstract

We prove that if $μ$ is a self-affine measure in the plane whose defining IFS acts totally irreducibly on $RP^{1}$ and satisfies an exponential separation condition, then its dimension is equal to its Lyapunov dimension.We also treat a class of reducible systems. This extends our previous work on the subject with Bárány to the overlapping case.

Cite this article

Michael Hochman, Ariel Rapaport, Hausdorff dimension of planar self-affine sets and measures with overlaps. J. Eur. Math. Soc. 24 (2022), no. 7, pp. 2361–2441

DOI 10.4171/JEMS/1127