A Randomized Parallel Algorithm with Run Time O(n2) for Solving an n × n System of Linear Equations
Abstract
In this note, following suggestions by Tao, we extend the randomized algorithm for linear equations over prime fields by Raghavendra to a randomized algorithm for linear equations over the reals. We also show that the algorithm can be parallelized to solve a system of linear equations A x = b with a regular n × n matrix A in time O(n2), with probability one. Note that we do not assume that A is symmetric.
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