A Fubini-type theorem for Hausdorff dimension (2106.09661v3)

Abstract: It is well known that a classical Fubini theorem for Hausdorff dimension cannot hold; that is, the dimension of the intersections of a fixed set with a parallel family of planes do not determine the dimension of the set. Here we prove that a Fubini theorem for Hausdorff dimension does hold modulo sets that are small on all Lipschitz graphs. We say that $G\subset \mathbb{R}^k\times \mathbb{R}^n$ is $\Gamma_k$-null if for every Lipschitz function $f:\mathbb{R}^k\to \mathbb{R}^n$ the set ${t\in\mathbb{R}^k\,:\,(t,f(t))\in G}$ has measure zero. We show that for every Borel set $E\subset \mathbb{R}^k\times \mathbb{R}^n$ with $\dim (\text{proj}{\mathbb{R}^k} E)=k$ there is a $\Gamma_k$-null subset $G\subset E$ such that $$\dim (E\setminus G) = k+\text{ess-}\sup(\dim E_t)$$ where $\text{ess-}\sup(\dim E_t)$ is the essential supremum of the Hausdorff dimension of the vertical sections ${E_t}{t\in \mathbb{R}^k}$ of $E$. In addition, we show that, provided that $E$ is not $\Gamma_k$-null, there is a $\Gamma_k$-null subset $G\subset E$ such that for $F=E \setminus G$, the Fubini-property holds, that is, $\dim (F) = k+\text{ess-}\sup(\dim F_t)$. We also obtain more general results by replacing $\mathbb{R}^k$ by an Ahlfors-David regular set. Applications of our results include Fubini-type results for unions of affine subspaces, connection to the Kakeya conjecture and projection theorems.