On restricted families of projections in R3

Abstract

We study projections onto non-degenerate one-dimensional families of lines and planes in R3. Using the classical potential theoretic approach of R. Kaufman, one can show that the Hausdorff dimension of at most 1/2-dimensional sets B ⊂ R3 is typically preserved under one-dimensional families of projections onto lines. We improve the result by an , proving that if H B = s > 1/2, then the packing dimension of the projections is almost surely at least σ(s) > 1/2. For projections onto planes, we obtain a similar bound, with the threshold 1/2 replaced by 1. In the special case of self-similar sets K ⊂ R3 without rotations, we obtain a full Marstrand type projection theorem for one-parameter families of projections onto lines. The H K ≤ 1 case of the result follows from recent work of M. Hochman, but the H K > 1 part is new: with this assumption, we prove that the projections have positive length almost surely.