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Reorthogonalized Block Classical Gram--Schmidt

Numerical Analysis 2011-08-23 v1

Abstract

A new reorthogonalized block classical Gram--Schmidt algorithm is proposed that factorizes a full column rank matrix AA into A=QRA=QR where QQ is left orthogonal (has orthonormal columns) and RR is upper triangular and nonsingular. With appropriate assumptions on the diagonal blocks of RR, the algorithm, when implemented in floating point arithmetic with machine unit \macheps\macheps, produces QQ and RR such that IQTQ2=O(\macheps)\| I- Q^{T} Q \|_2 =O(\macheps) and AQR2=O(\machepsA2)\| A-QR \|_2 =O(\macheps \| A \|_2). The resulting bounds also improve a previous bound by Giraud et al. [Num. Math., 101(1):87-100,\ 2005] on the CGS2 algorithm originally developed by Abdelmalek [BIT, 11(4):354--367,\ 1971]. \medskip Keywords: Block matrices, Q--R factorization, Gram-Schmidt process, Condition numbers, Rounding error analysis.

Keywords

Cite

@article{arxiv.1108.4209,
  title  = {Reorthogonalized Block Classical Gram--Schmidt},
  author = {Jesse L. Barlow and Alicja Smoktunowicz},
  journal= {arXiv preprint arXiv:1108.4209},
  year   = {2011}
}

Comments

19 pages

R2 v1 2026-06-21T18:53:21.790Z