[[1] M. Benzi. A Direct Row-Projection Method for Sparse Linear Systems. PhD. Thesis. Department of Mathematics. North Carolina State University, Raleigh, NC, 1993.]Search in Google Scholar
[[2] M. Benzi, J. K. Cullum, and M. Tůma. Robust approximate inverse preconditioning for the conjugate gradient method. SIAM J. Sci. Comput., 22(4):1318–1332, 2000.10.1137/S1064827599356900]Search in Google Scholar
[[3] M. Benzi, R. Kouhia, and M. Tůma. An assessment of some preconditioning techniques in shell problems. Communications in Numerical Methods in Engineering, 14:897–906, 1998.10.1002/(SICI)1099-0887(1998100)14:10<897::AID-CNM196>3.0.CO;2-L]Search in Google Scholar
[[4] M. Benzi, R. Kouhia, and M. Tůma. Stabilized and block approximate inverse preconditioners for problems in solid and structural mechanics. Comput. Methods Appl. Mech. Engrg., 190(49-50):6533–6554, 2001.10.1016/S0045-7825(01)00235-3]Search in Google Scholar
[[5] M. Benzi, C. D. Meyer, and M. Tůma. A sparse approximate inverse preconditioner for the conjugate gradient method. SIAM J. Sci. Comput., 17(5):1135–1149, 1996.10.1137/S1064827594271421]Search in Google Scholar
[[6] M. Challacombe. A simplified density matrix minimization for linear scaling self-consistent field theory. J. Chem. Phys., 110:2332–2342, 1999.10.1063/1.477969]Search in Google Scholar
[[7] M. Challacombe. A general parallel sparse-blocked matrix multiply for linear scaling scf theory. Comp. Phys. Comm., 128:93–107, 2000.10.1016/S0010-4655(00)00074-6]Search in Google Scholar
[[8] T. Davis and Y. Hu. The university of florida sparse matrix collection. ACM Transactions on Mathematical Software, 38 (1):1–25, 2011.10.1145/2049662.2049663]Search in Google Scholar
[[9] J. Duintjer Tebbens and M. Tůma. On incremental condition estimators in the 2-norm. SIAM J. Matrix Anal. Appl., 35(1):174–197, 2014.10.1137/130922872]Search in Google Scholar
[[10] N. J. Higham. Accuracy and stability of numerical algorithms. Society for Industrial and Applied Mathematics (SIAM), Philadelphia, PA, second edition, 2002.10.1137/1.9780898718027]Search in Google Scholar
[[11] J. Kopal. Generalized Gram–Schmidt Process: Its Analysis and Use in Preconditioning. PhD thesis, Technical University in Liberec, 2014.]Search in Google Scholar
[[12] J. Kopal, M. Rozložník, and M. Tůma. Factorized approximate inverses with adaptive dropping. SIAM J. Sci. Comput., 38(3):A1807–A1820, 2016.10.1137/15M1030315]Search in Google Scholar
[[13] M. Rozložník, M. Tůma, A. Smoktunowicz, and J. Kopal. Rounding error analysis of orthogonalization with a non-standard inner product. BIT Numer Math, 52:1035–1058, 2012.10.1007/s10543-012-0398-9]Search in Google Scholar
[[14] E. H. Rubensson, A. G. Artemov, A. Kruchinina, and E. Rudberg. Localized inverse factorization. arXiv:1812.04919.]Search in Google Scholar