Covering point-sets with parallel hyperplanes and sparse signal recovery

Abstract

We give a new deterministic construction of integer sensing matrices that can be used for the recovery of integer-valued signals in compressed sensing. This is a family of n × d integer matrices, d ≥ n, with bounded sup-norm and the property that no column vectors are linearly dependent, ≤ n. Further, if ≤ o( n) then d/n ∞ as n ∞. Our construction comes from particular sets of difference vectors of point-sets in Rn that cannot be covered by few parallel hyperplanes. We construct examples of such sets on the 0, 1 grid and use them for the matrix construction. We also show a connection of our constructions to a simple version of the Tarski plank problem.