Solving Linear Programs in the Current Matrix Multiplication Time

Michael B. Cohen, Y. Lee, Zhao Song
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引用次数: 42

Abstract

This article shows how to solve linear programs of the form minAx=b,x≥ 0 c⊤ x with n variables in time O*((nω+n2.5−α/2+n2+1/6) log (n/δ)), where ω is the exponent of matrix multiplication, α is the dual exponent of matrix multiplication, and δ is the relative accuracy. For the current value of ω δ 2.37 and α δ 0.31, our algorithm takes O*(nω log (n/δ)) time. When ω = 2, our algorithm takes O*(n2+1/6 log (n/δ)) time. Our algorithm utilizes several new concepts that we believe may be of independent interest: • We define a stochastic central path method. • We show how to maintain a projection matrix √ WA⊤ (AWA⊤)−1A√ W in sub-quadratic time under \ell2 multiplicative changes in the diagonal matrix W.
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求解当前矩阵乘法时间下的线性程序
本文给出了在时间为O*((nω+n2.5 - α/2+n2+1/6) log (n/δ))的情况下,如何求解形式为minAx=b,x≥0 c∞x有n个变量的线性规划,其中ω为矩阵乘法的指数,α为矩阵乘法的对偶指数,δ为相对精度。对于ω δ 2.37和α δ 0.31的电流值,我们的算法需要O*(nω log (n/δ))时间。当ω = 2时,我们的算法需要O*(n2+1/6 log (n/δ))时间。我们的算法利用了几个我们认为可能独立感兴趣的新概念:•我们定义了一个随机中心路径方法。•我们展示了如何在对角矩阵W的\ell2乘法变化下,在次二次时间内维持一个投影矩阵√WA∈(AWA∈)−1A∈W。
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