A Marstrand-type restricted projection theorem in $\mathbb{R}^{3}$

Abstract: Marstrand's projection theorem from $1954$ states that if $K \subset \mathbb{R}^{3}$ is an analytic set, then, for $\mathcal{H}^{2}$ almost every $e \in S^{2}$, the orthogonal projection $\pi_{e}(K)$ of $K$ to the line spanned by $e$ has Hausdorff dimension $\min{\dim_{\mathrm{H}} K,1}$. This paper contains the following sharper version of Marstrand's theorem. Let $V \subset \mathbb{R}^{3}$ be any $2$-plane, which is not a subspace. Then, for $\mathcal{H}^{1}$ almost every $e \in S^{2} \cap V$, the projection $\pi_{e}(K)$ has Hausdorff dimension $\min{\dim_{\mathrm{H}} K,1}$. For $0 \leq t < \dim_{\mathrm{H}} K$, we also prove an upper bound for the Hausdorff dimension of those vectors $e \in S^{2} \cap V$ with $\dim_{\mathrm{H}} \rho_{e}(K) \leq t < \dim_{\mathrm{H}} K$.