带部分支点的高斯消元的平均情况分析

IF 1.5 1区 数学 Q2 STATISTICS & PROBABILITY Probability Theory and Related Fields Pub Date : 2024-04-22 DOI:10.1007/s00440-024-01276-2
Han Huang, Konstantin Tikhomirov
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引用次数: 0

摘要

带部分支点的高斯消元法(GEPP)是求解线性方程组的经典算法。虽然在特定情况下,舍入误差会导致 GEPP 的精度损失非常大,但经验证据有力地表明,对于典型的平方系数矩阵,GEPP 在数值上是稳定的。我们通过证明给定随机(n/times n/)标准高斯系数矩阵 A,具有部分支点的高斯消元法的增长因子在 n 上最多为多项式大,概率接近于 1,从而为这一现象提供了(部分)理论依据。这意味着在概率接近于1的情况下,使用GEPP求解m比特精度的\(Ax = b\) 所需的精度比特数是\(m+O(\log n)\),这改进了桑卡尔(Sankar)早先的估计值\(m+O(\log ^2 n)\),我们猜想这个估计值在数量级上是最优的。我们进一步提供了增长因子的尾部估计值,可用于支持经验观察,即 GEPP 比无支点的高斯消除法更稳定。
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Average-case analysis of the Gaussian elimination with partial pivoting

The Gaussian elimination with partial pivoting (GEPP) is a classical algorithm for solving systems of linear equations. Although in specific cases the loss of precision in GEPP due to roundoff errors can be very significant, empirical evidence strongly suggests that for a typical square coefficient matrix, GEPP is numerically stable. We obtain a (partial) theoretical justification of this phenomenon by showing that, given the random \(n\times n\) standard Gaussian coefficient matrix A, the growth factor of the Gaussian elimination with partial pivoting is at most polynomially large in n with probability close to one. This implies that with probability close to one the number of bits of precision sufficient to solve \(Ax = b\) to m bits of accuracy using GEPP is \(m+O(\log n)\), which improves an earlier estimate \(m+O(\log ^2 n)\) of Sankar, and which we conjecture to be optimal by the order of magnitude. We further provide tail estimates of the growth factor which can be used to support the empirical observation that GEPP is more stable than the Gaussian Elimination with no pivoting.

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来源期刊
Probability Theory and Related Fields
Probability Theory and Related Fields 数学-统计学与概率论
CiteScore
3.70
自引率
5.00%
发文量
71
审稿时长
6-12 weeks
期刊介绍: Probability Theory and Related Fields publishes research papers in modern probability theory and its various fields of application. Thus, subjects of interest include: mathematical statistical physics, mathematical statistics, mathematical biology, theoretical computer science, and applications of probability theory to other areas of mathematics such as combinatorics, analysis, ergodic theory and geometry. Survey papers on emerging areas of importance may be considered for publication. The main languages of publication are English, French and German.
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