Exceptional set estimates for radial projections in Rn
Abstract
We prove two conjectures in this paper. The first conjecture is by Lund, Pham and Thu: Given a Borel set A⊂ Rn such that A∈ (k,k+1] for some k∈\1,…,n-1\. For 0<s<k, we have \[ dim(\y∈ Rn A dim (πy(A)) < s\)≤ \k+s - A,0\. \] The second conjecture is by Liu: Given a Borel set A⊂ Rn, then \[ dim (\x∈ Rn A dim(πx(A))<dim A\) ≤ dim A. \]
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