On restricted projections to planes in R3

Abstract

Let γ:[0,1]→ S2 be a non-degenerate curve in R3, that is to say, (γ(θ),γ'(θ),γ"(θ))≠ 0. For each θ∈[0,1], let Vθ=γ(θ) and let πθ:R3→ Vθ be the orthogonal projections. We prove that if A⊂ R3 is a Borel set, then for a.e. θ∈ [0,1] we have dim(πθ(A))=\2,dim A\. More generally, we prove an exceptional set estimate. For A⊂R3 and 0 s 2, define Es(A):=\θ∈[0,1]: dim(πθ(A))<s\. We have dim(Es(A)) 1+s-dim(A). We also prove that if dim(A)>2, then for a.e. θ∈[0,1] we have H2(πθ (A))>0.

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