Low-rank binary matrix approximation in column-sum norm
Abstract
We consider 1-Rank-r Approximation over GF(2), where for a binary m× n matrix A and a positive integer r, one seeks a binary matrix B of rank at most r, minimizing the column-sum norm || A - B||1. We show that for every ∈ (0, 1), there is a randomized (1+)-approximation algorithm for 1-Rank-r Approximation over GF(2) of running time mO(1)nO(24r· -4). This is the first polynomial time approximation scheme (PTAS) for this problem.
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