A Marstrand projection theorem for lines
Abstract
Fix integers 1<k<n. For V∈ G(k,n), let PV: Rn→ V be the orthogonal projection. For V∈ G(k,n), define the map \[ πV: A(1,n)→ A(1,V) V. \] \[ PV(). \] For any 0<a<dim(A(1,n)), we find the optimal number s(a) such that the following is true. For any Borel set A ⊂ A(1,n) with dim(A)=a, we have \[ dim(πV(A))=s(a), for a.e. V∈ G(k,n). \] When A(1,n) is replaced by A(0,n)=Rn, it is the classical Marstrand projection theorem, for which s(a)=\k,a\. A new ingredient of the paper is the Fourier transform on affine Grassmannian.
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