A Note on Property Testing of the Binary Rank

Abstract

Let M be a n× m (0,1)-matrix. We define the s-binary rank, brs(M), of M to be the minimal integer d such that there are d monochromatic rectangles that cover all the 1-entries in the matrix, and each 1-entry is covered by at most s rectangles. When s=1, this is the binary rank,~br(M), known from the literature. Let R(M) and C(M) be the set of rows and columns of~M, respectively. We use the result of Sgall (Comb. 1999) to prove that if M has s-binary rank at most~d, then |R(M)|· |C(M)| d s2d where d s=Σi=0sd i. This bound is tight; that is, there exists a matrix M' of s-binary rank d such that |R(M')|· |C(M')|= d s2d. Using this result, we give a new one-sided adaptive and non-adaptive testers for (0,1)-matrices of s-binary rank at most d (and exactly d) that makes O(d s2d/ε) and O(d s2d/ε2) queries, respectively. For a fixed s, this improves the query complexity of the tester of Parnas et al. (Theory Comput. Syst. 2021) by a factor of (2d).