Almost Separable Matrices

Abstract

An m × n matrix A with column supports \Si\ is k-separable if the disjunctions i ∈ K Si are all distinct over all sets K of cardinality k. While a simple counting bound shows that m > k 2 n/k rows are required for a separable matrix to exist, in fact it is necessary for m to be about a factor of k more than this. In this paper, we consider a weaker definition of `almost k-separability', which requires that the disjunctions are `mostly distinct'. We show using a random construction that these matrices exist with m = O(k n) rows, which is optimal for k = O(n1-β). Further, by calculating explicit constants, we show how almost separable matrices give new bounds on the rate of nonadaptive group testing.