A note on an SOR-like method for augmented systems
Li, C.; Li, Z.; Evans, D. J.; Zhang, T.
IMA Journal of Numerical Analysis, 2003, vol. 23, no. 4, pp.
581-592, Ingenta.
Newton-SOR Method for Fast Statistical Tomographic Image
Reconstruction
Kudo, H.; Sawada, S.
Systems and Computers in Japan, 2003, vol. 34, no. 4, pp. 1-11,
Ingenta.
On the Optimal Relaxation Parameters to the Improved SOR
Method with Orderings
Muroya, Y.; Ishiwata, E.
Tokyo Journal of Mathematics, 2002, vol. 25, no. 1, pp. 49-62,
Ingenta.
On performance of SOR method for solving nonsymmetric linear
systems.
Wo'znicki, Zbigniew I.
J. Comput. Appl. Math. 137 (2001), no. 1, 145--176,
MathSciNet.
Semiconvergence of block SOR method for singular linear
systems with p-cyclic matrices.
Song, Yongzhong
J. Comput. Appl. Math. 130 (2001), no. 1-2, 217--229,
MathSciNet.
Further Results on the Preconditioned SOR Method
Martins, M. M.; Evans, D. J.; Yousif, W.
International Journal of Computer Mathematics, 2001, vol. 77, no.
4, pp. 603-610, Ingenta.
A new class of modified line-SOR algorithms
Woznicki, Z.I.; Jedrzejec, H.A.
Journal of Computational and Applied Mathematics, v 131, n 1-2,
Jun 1, 2001, p 89-142, Compendex.
A SOR-base Variable Preconditioned GCR Method
Abe, K.; Zhang, S.-L.; Hasegawa, H.; Himeno, R.
Transactions- Japan Society for Industrial and Applied
Mathematics, 2001, vol. 11, no. 4, pp. 157-170, Ingenta.
The Successive Over Relaxation Method (SOR) and Markov
Chains
Niethammer, W.
Annals of Operations Research, 2001, vol. 103, no. 1/4, pp.
351-358, Ingenta.
Can SOR be an efficient method for solving nonsymmetric linear
systems?
Woznicki, Z. I.
Nonlinear Analysis Theory Methods and Applications, 2001, vol. 47,
no. ER6, pp. 4295-4306, Ingenta.
Successive overrelaxation (SOR) and related methods
Hadjidimos, A.
Journal of Computational and Applied Mathematics, v 123, n 1-2,
Nov, 2000, p 177-199, Compendex.
New parallel SOR method by domain
partitioning.
Xie, Dexuan; Adams, Loyce
SIAM J. Sci. Comput. 20 (1999), no. 6, 2261--2281 (electronic),
MathSciNet.
Note on the extended convergence of SOR for two-periodic
Markov chains
Niethammer, Wilhelm
Linear Algebra and Its Applications, v 287, n 1-3, Jan 15, 1999, p
315-322 , Compendex.
Improved SOR method with orderings and direct
methods.
Ishiwata, Emiko; Muroya, Yoshiaki
Japan J. Indust. Appl. Math. 16 (1999), no. 2, 175--193,
MathSciNet.
Adaptive Improved Block SOR Method with Orderings.
Ishiwata, E.; Muroya, Y.; Isogai, K.
Japan journal of industrial and applied mathematics, 1999, vol.
16, no. 3, pp. 443, Ingenta.
A practical choice of parameters in improved SOR-Newton method
with orderings.
Ishiwata, E.
Journal of Computational and Applied Mathematics, 1999, vol. 102,
no. 2, pp. 315, Ingenta.
Block SOR methods for rank-deficient least-squares
problems.
Santos, C. H.; Silva, B. P. B.; Yuan, J. Y.
J. Comput. Appl. Math. 100 (1998), no. 1, 1--9,
MathSciNet.
SOR as a preconditioner II
DeLong, M.A.; Ortega, J.M.
Applied Numerical Mathematics, v 26, n 4, Apr, 1998, p 465-481,
Compendex.
Preconditioning the linear system for the SOR
method.
Li, Changjun; Evans, D. J.
Int. J. Comput. Math. 66 (1998), no. 1-2, 101--111,
MathSciNet.
Main convergence theorems for the improved SOR method with
orderings.
Ishiwata, Emiko; Muroya, Yoshiaki
Int. J. Comput. Math. 66 (1998), no. 1-2, 123--147,
MathSciNet.
A Generalized SOR Method for Dense Linear Systems of Boundary
Element Equations.
Davey, K.; Bounds, S.
SIAM journal on scientific computing, 1998, vol. 19, no. 3, pp.
953, Ingenta.
Methodes iteratives de type SOR pour resoudre les problemes
des moindres carres (SOR type iterative methods for solving least
squares problems)
Song, Yongzhong; Goro, Oumarou
International Journal of Computer Mathematics, v 68, n 1-2, 1998,
p 99-118 Language: French, Compendex.
On
SOR Waveform Relaxation Methods
Jan Janssen; Stefan Vandewalle
SIAM Journal on Numerical Analysis, Vol. 34, No. 6. (Dec., 1997),
pp. 2456-2481, Jstor.
Stable spiral orbits of SOR Durand-Kerner's method applied ot
the equation x to the d=0.
Yamagishi, Y.
Journal of computational and applied mathematics, 1997, vol. 82,
no. 1/2, pp. 465, Ingenta.
On nonlinear SOR-like methods, IV - SOR-secant method for
nondifferentiable problems.
Ishihara, K.; Yamamoto, T.
Mathematica japonicae [sic], 1997, vol. 46, no. 1, pp.
103, Ingenta.
Performance of the single-pass position monitor at
SOR-RING
Kudo, Hirofumi; Shinoe, Kenji; Takaki, Hiroyuki; Koseki, Tadashi;
Nakamura, Norio; Kamiya, Yukihide; Honda, Tohru
Proceedings of the IEEE Particle Accelerator Conference, v 2,
1997, p 2146-2148, Compendex.
A note on the convergence of the Weierstrass sor method for
polynomial roots.
Petkovic, M.S.; Kjurkchiev, N.
Journal of computational and applied mathematics, 1997, vol. 80,
no. 1, pp. 163, Ingenta.
On Nonlinear SOR-like Methods, II - Convergence of the
SOR-Newton Method for Mildly Nonlinear Equations.
Ishihara, K.; Muroya, Y.; Yamamoto, Tetsuro
Japan journal of industrial and applied mathematics, 1997, vol.
14, no. 1, pp. 99, Ingenta.
Implementation of the multicolored SOR method on a vector
supercomputer
Fujino, Seiji; Himeno, Ryutaro; Kojima, Akira; Terada, Kazuo
IEICE Transactions on Information and Systems, v E80-D, n 4, Apr,
1997, p 518-523, Compendex.
SOR as a parallel preconditioner
DeLong, M.A.; Ortega, J.M. Source: Proc Conf Linear Nonlinear
Conjugate Grad Rel Methods, 1996, p 143
Database: , Compendex.
The exact convergence and divergence domains of the SOR
methods for 4-cyclic matrices.
Toutounian, Faezeh
J. Inst. Math. Comput. Sci. Math. Ser. 9 (1996), no. 3, 233--243,
MathSciNet.
New simple criteria for the Jacobi, Gauss-Seidel, and SOR
iterations
Huang, T.-Z.
Zeitschrift fuer Angewandte Mathematik und Mechanik, ZAMM, Applied
Mathematics and Mechanics, v 76, n 1, 1996, p 57, Compendex.
SOR as a preconditioner
DeLong, M.A.; Ortega, J.M.
Applied Numerical Mathematics, v 18, n 4, Oct, 1995, p 431,
Compendex.
Error checking of solving the Poisson's equation by SOR-step
iteration method
Tiau, Taixing
Dianzi Keji Daxue Xuebao/Journal of University of Electronic
Science and Technology of China, v 24, n 1, Feb, 1995, p 89,
Compendex.
Sor-Secant
Methods
Jose Mario Martinez
SIAM Journal on Numerical Analysis, Vol. 31, No. 1. (Feb., 1994),
pp. 217-226, Jstor.
Improving the SOR method
Li, C.-J.; Evans, D.J.
International Journal of Computer Mathematics, v 54, n 3-4, 1994,
p 207, Compendex.
On the convergence rate of SOR: a worst case estimate
Oswald, P.
Computing (Vienna/New York), v 52, n 3, 1994, p 245-255,
Compendex.
The Acceleration of the ADI Method by SOR.
Li, C.; Evans, D. J.
International journal of computer mathematics, 1994, vol. 50, no.
1/2, pp. 45, Ingenta.
SOR iterative algorithm for the finite difference and the
finite element methods that is efficient and parallelizable
Wang, K.P.; Bruch, J.C. Jr.
Advances in Engineering Software, v 21, n 1, 1994, p 37-48,
Compendex.
Convergence of the extrapolated AOR and SOR iterative
methods
Xinmin, Wang; Evans, D.J.
International Journal of Computer Mathematics, v 52, n 1-2, 1994,
p 65-74, Compendex.
A successive over-relaxation method for quadratic programming
problems with interval constraints.
Shimazu, Yoshikazu; Fukushima, Masao; Ibaraki, Toshihide
J. Oper. Res. Soc. Japan 36 (1993), no. 2, 73--89,
MathSciNet.
Optimal stretched parameters for the SOR iterative method
[CAM 1309].
Noutsos, D.
Journal of computational and applied mathematics, 1993, vol. 48,
no. 3, pp. 293, Ingenta.
A comparison of acceleration techniques applied to the SOR
method.
da Cunha, Rudnei Dias; Hopkins, Tim
Nonlinear numerical methods and rational approximation, II
(Wilrijk, 1993), 247--260, Math. Appl., 296, Kluwer Acad. Publ.,
Dordrecht, 1994, MathSciNet.
On Domains of Superior Convergence of SSOR Method to that of
the SOR Method.
Hadijidimos, A.; Neumann, Michael
Linear algebra and its applications, 1993, vol. 187, pp. 67,
Ingenta.
SOR method for multistaged separation columns
computations.
Onana, A.; Hikolo, A. Mbala
Computers & chemical engineering, 1993, vol. 17, no. 8, pp.
799, Ingenta.
Some sufficient conditions on the convergence of SOR
iteration
Dunhe, Gu
Huadong Gongxueyuan Xuebao/Journal of East China Institute of
Technology, n 2, 1993, p 23, Compendex.
Is the Optimal Omega Best for the SOR Iteration Method?
Eiermann, M.; Varga, R. S.
Linear algebra and its applications, 1993, vol. 182, pp. 257,
Ingenta.
On domains of superior convergence of the SSOR method to that
of the SOR method
Hadjidimos, A.; Neumann, Michael
Linear Algebra and Its Applications, v 187, Jul 1, 1993, p 67,
Compendex.
Optimum Modified SOR (MSOR) Method in a Special Case.
Yeyios, A.K.
Journal of computational mathematics, 1992, vol. 10, no. 4, pp.
358, Ingenta.
A Newton-SOR Method for Spatial Price Equilibrium.
Marcotte, Patrice; Marquis, Gerald; Zubieta, Lourdes
Transportation science, 1992, vol. 26, no. 1, pp. 36,
Ingenta.
Diagonalizing the Adaptive SOR iteration Method.
Dancis, Jerome
SIAM journal on matrix analysis and applications, 1991, vol. 12,
no. 4, pp. 661, Ingenta.
On the efficiency of a SOR-like method suited to vector
processors.
Sugihara, M.; Oyanagi, Y.; Mori, M.
Journal of computational and applied mathematics, 1991, vol. 35,
pp. 33, Ingenta.
On the efficiency of a SOR-line method suited to vector
processors.
Sugihara, M.; Oyanagi, Y.; Mori, M.
Journal of computational and applied mathematics, 1991, vol. 35,
no. 1/3, pp. 33, Ingenta.
The Optimal omega Is Not Best for the SOR Iteration
Method.
Dancis, Jerome
Linear algebra and its applications, 1991, vol. 154/156, pp. 819,
Ingenta.
A Parallelizable SOR-Like Method: Systems With Plus-Shaped and
Linear Spectra.
De Pillis, J
Linear algebra and its applications, 1991, vol. 154/156, pp. 551,
Ingenta.
Block colouring schemes for the SOR method on local memory
parallel computers.
Block, U.; Frommer, A.; Mayer, G.
Parallel Comput. 14 (1990), no. 1, 61--75,
MathSciNet.
SOR Method and P-Cyclic Matrices (II).
Evans, D.J.; Li, Changjun
International journal of computer mathematics, 1990, vol. 37, no.
3/4, pp. 239, Ingenta.
Nonlinear circuit analysis using the Newton-SOR continuation
method.
Cheng, K.K.M.; Everard, J.K.A.
Electronics letters, 1990, vol. 26, no. 25, pp. 2120,
Ingenta.
Convergence Analysis of the Modified SOR (MSOR) Method.
Yeyios, A.K.; Psimarni, A.
International journal of computer mathematics, 1990, vol. 35, no.
1/4, pp. 231, Ingenta.
Parallel-vector calculation of the SOR method
Yokokawa, Mitsuo
Trans. of the Japan Society of Mechanical Engineers, Part B, v 56,
n 524, Apr, 1990, p 1062-1065, Compendex.
SOR Method and P-Cyclic Matrices (I).
Evans, D.J.; Li, C.
International journal of computer mathematics, 1990, vol. 36, no.
1/2, pp. 57, Ingenta.
Multicolour SOR method for the finite-element method
Wu, C.H.
Journal of Computational and Applied Mathematics, v 30, n 3, 1990,
p 283, Compendex.
A
Two-Level Four-Color SOR Method
C.-C. Jay Kuo; Bernard C. Levy
SIAM Journal on Numerical Analysis, Vol. 26, No. 1. (Feb., 1989),
pp. 129-151, Jstor.
The SOR Method on Parallel Computers.
Niethammer, W.
Numerische mathematik, 1989, vol. 56, no. 2/3, pp. 247--254,
Ingenta.
Optimum Extrapolated Method in a Special Case with Application
to SOR Method.
Psimarni, A.; Yeyios, A. K.
International journal of computer mathematics, 1989, vol. 31, no.
1/2, pp. 95, Ingenta.
Toward an effective two-parameter SOR
method.
Golub, Gene H.; de Pillis, John E.
Iterative methods for large linear systems (Austin, TX, 1988),
107--119, Academic Press, Boston, MA, 1990,
MathSciNet.
Extrapolated Gauss-Seidel I and SOR methods for least-squares
problems.
Evans, D. J.; Li, C.
Numer. Math. 53 (1988), no. 4, 485--498,
MathSciNet.
Convergence des méthodes SOR à paramètre
variable. (French) [On the convergence of variable parameter
point SOR methods]
Khalil, Mohammed; Rigal, Alain
C. R. Acad. Sci. Paris Sér. I Math. 306 (1988), no. 14,
629--634, MathSciNet.
A note on two block-SOR methods for sparse least squares
problems.
Freund, R.
Linear Algebra Appl. 88/89 (1987), 211--221,
MathSciNet.
Nonlinear successive over-relaxation.
Brewster, M. E.; Kannan, R.
Numer. Math. 44 (1984), no. 2, 309--315,
MathSciNet.
On the convergence of the symmetric SOR method for matrices
with red-black ordering.
Alefeld, G.
Numer. Math. 39 (1982), no. 1, 113--117,
MathSciNet.
On a relaxed SOR-method applied to nonsymmetric linear
systems.
Niethammer, W.; Schade, J.
J. Comput. Appl. Math. 1 (1975), no. 3, 133--136,
MathSciNet.
Generalized consistent ordering and the optimum successive
over-relaxation factor.
Nichols, Nancy K.; Fox, L.
Numer. Math. 13 1969 425--433, MathSciNet.
On generalizations of the theory of consistent orderings for
successive over-relaxation methods.
Verner, J. H.; Bernal, M. J. M.
Numer. Math. 12 1968 215--222, MathSciNet.
A contribution to the successive over-relaxation
method.
Humhal, Emil
Comment. Math. Univ. Carolinae 7 1966 237--247,
MathSciNet.
A method for finding the optimum successive over-relaxation
parameter.
Reid, J. K.
Comput. J. 9 1966 200--204, MathSciNet.
On the round-off error in the method of successive
over-relaxation.
Lynn, M. Stuart
Math. Comp. 18 1964 36--49, MathSciNet.
A practical technique for the determination of the optimum
relaxation factor of the successive over-relaxation
method.
Kulsrud, H. E.
Comm. ACM 4 1961 184--187, MathSciNet.
