Fast deterministic algorithms for matrix completion problems

Abstract

Ivanoys, Karpinski and Saxena (2010) have developed a deterministic polynomial time algorithm for finding scalars x1, ..., xn that maximize the rank of the matrix B0 + x1 B1 + ... + xn Bn for given matrices B0, B 1, ..., Bn , where B1, ..., Bn are of rank one. Their algorithm runs in O(m4.37 n) time, where m is the larger of the row size and the column size of the input matrices. In this paper, we present a new deterministic algorithm that runs in O((m + n)2.77) time, which is faster than the previous one unless n is much larger than m. Our algorithm makes use of an efficient completion method for mixed matrices by Harvey, Karger and Murota (2005). As an application of our completion algorithm, we devise a deterministic algorithm for the multicast problem with linearly correlated sources. We also consider a skew-symmetric version: maximize the rank of the matrix B0 + x1 B1 + ... + xn Bn for given skew-symmetric matrices B0, B1, ..., Bn , where B1, ..., Bn are of rank two. We design the first deterministic polynomial time algorithm for this problem based on the concept of mixed skew-symmetric matrices and the linear delta-covering algorithm of Geelen, Iwata and Murota (2003). © 2013 Springer-Verlag.