Low Rank Matrix Approximation in Linear Time
Abstract
M N B [1]\| #1 \|F [2]μopt#1, #2 [1](#1) Given a matrix with n rows and d columns, and fixed k and , we present an algorithm that in linear time (i.e., O( )) computes a k-rank matrix with approximation error - 2 ≤ (1+) k, where = n d is the input size, and k is the minimum error of a k-rank approximation to . This algorithm succeeds with constant probability, and to our knowledge it is the first linear-time algorithm to achieve multiplicative approximation.
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