Geometry of low nonnegative rank matrix completion

Abstract

We study completion of partial matrices with nonnegative entries to matrices of nonnegative rank at most r for some r ∈ N. Most of our results are for r ≤ 3. We show that a partial matrix with nonnegative entries has a nonnegative rank-1 completion if and only if it has a rank-1 completion. This is not true in general when r ≥ 2. For 3 × 3 matrices, we characterize all the patterns of observed entries when having a rank-2 completion is equivalent to having a nonnegative rank-2 completion. If a partial matrix with nonnegative entries has a rank-r completion that is nonnegative, where r ∈ \1,2\, then it has a nonnegative rank-r completion. We will demonstrate examples for r=3 where this is not true. We do this by introducing a geometric characterization for nonnegative rank-r completion employing families of nested polytopes which generalizes the geometric characterization for nonnegative rank introduced by Cohen and Rothblum (1993).