Covering points by hyperplanes and related problems

Abstract

For a set P of n points in Rd, for any d 2, a hyperplane h is called k-rich with respect to P if it contains at least k points of P. Answering and generalizing a question asked by Peyman Afshani, we show that if the number of k-rich hyperplanes in Rd, d ≥ 3, is at least (nd/kα + n/k), with a sufficiently large constant of proportionality and with d α < 2d-1, then there exists a (d-2)-flat that contains (k(2d-1-α)/(d-1)) points of P. We also present upper bound constructions that give instances in which the above lower bound is tight. An extension of our analysis yields similar lower bounds for k-rich spheres or k-rich flats.

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