Kakeya-type sets in finite vector spaces
Abstract
For a finite vector space V and a non-negative integer r V we estimate the smallest possible size of a subset of V, containing a translate of every r-dimensional subspace. In particular, we show that if K⊂ V is the smallest subset with this property, n denotes the dimension of V, and q is the size of the underlying field, then for r bounded and r<n rqr-1 we have |V K|=(nqn-r+1). This improves previously known bounds |V K|=(qn-r+1) and |V K|=O(n2qn-r+1).
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