Spread Furstenberg Sets
Abstract
We obtain new bounds for (a variant of) the Furstenberg set problem for high dimensional flats over Rn. In particular, let F⊂ Rn, 1≤ k ≤ n-1, s∈ (0,k], and t∈ (0,k(n-k)]. We say that F is a (s,t;k)-spread Furstenberg set if there exists a t-dimensional set of subspaces P ⊂ G(n,k) such that for all P∈ P, there exists a translation vector aP ∈ Rn such that (F (P + aP)) ≥ s. We show that given k ≥ k0 +1 (where k0:= k0(n) is sufficiently large) and s>k0, every (s,t;k)-spread Furstenberg set F in Rn satisfies \[ F ≥ n-k + s - k(n-k) - t s - k0 +1 . \] Our methodology is motivated by the work of the second author, Dvir, and Lund over finite fields.
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