Terence L. J. Harris
Published 2022-08-14Version 1
Let $\gamma: I \to S^2$ be a $C^2$ curve with $\det(\gamma, \gamma', \gamma'')$ nonvanishing, and for each $\theta \in I$ let $\rho_{\theta}$ be orthogonal projection onto the line through $\gamma(\theta)$. It is shown that if $A \subseteq \mathbb{R}^3$ is a Borel set of Hausdorff dimension strictly greater than 1, then $\rho_{\theta}(A)$ has positive length for a.e. $\theta \in I$. This answers a question raised by K\"aenm\"aki, Orponen and Venieri.
Improved bounds for restricted families of projections to planes in $\mathbb{R}^{3}$
On the dimension of $s$-Nikodým sets
Integrability of orthogonal projections, and applications to Furstenberg sets
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