Restricted families of projections onto planes: The general case of nonvanishing geodesic curvature

Abstract

It is shown that if γ: [a,b] S2 is C3 with (γ, γ', γ'') ≠ 0, and if A ⊂eq R3 is a Borel set, then πθ (A) ≥ \ 2, A, A2 + 34 \ for a.e. θ ∈ [a,b], where πθ denotes projection onto the orthogonal complement of γ(θ) and ``'' refers to Hausdorff dimension. This partially resolves a conjecture of F\"assler and Orponen in the range 1< A ≤ 3/2, which was previously known only for non-great circles. For 3/2 < A < 5/2 this improves the known lower bound for this problem.