Bibliography for Jacobi and Gauss-Seidel Iteration

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  1. A modified Gauss-Seidel algorithm of three-phase power flow analysis in distribution networks
    Teng, J. H.
    International Journal of Electrical Power and Energy Systems, 2002, vol. 24, no. ER2, pp. 97-102 , Ingenta.  
  2. Over-relaxation methods and coupled Markov chains for Monte Carlo simulation
    Barone, P.; Sebastiani, G.; Stander, J.
    Statistics and Computing, 2002, vol. 12, no. 1, pp. 17-26 , Ingenta.  
  3. A Gauss-Seidel projection method for micromagnetics simulations.
    Wang, Xiao-Ping; García-Cervera, Carlos J.; E, Weinan
    J. Comput. Phys. 171 (2001), no. 1, 357--372, MathSciNet.  
  4. Comparison Theorems for the Preconditioning Gauss-Seidel Method
    Hirano, H.; Niki, H.
    Information, 2001, vol. 4, no. 3, pp. 303-310 , Ingenta.  
  5. Interval Gauss-Seidel Method for Generalized Solution Sets to Interval Linear Systems
    Shary, S. P.
    Reliable Computing, 2001, vol. 7, no. 2, pp. 141-155 , Ingenta.  
  6. Eigenvalue Analysis of a Block Red-Black Gauss-Seidel Preconditioner Applied to the Hermite Collocation Discretization of Poisson's Equation
    Brill, S. H.; Pinder, G. F.
    Numerical Methods for Partial Differential Equations, 2001, vol. 17, no. 3, pp. 204-228 , Ingenta.  
  7. 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.  
  8. 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.  
  9. 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.  
  10. On performance of SOR method for solving nonsymmetric linear systems
    Woznicki, Z. I.
    Journal of Computational and Applied Mathematics, 2001, vol. 137, no. ER1, pp. 145-176 , Ingenta.  
  11. 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.  
  12. Interval Gauss-Seidel method for generalized solution sets to interval linear systems.
    Shary, Sergey P.
    Modal intervals and its applications (Girona, 1999). Reliab. Comput. 7 (2001), no. 2, 141--155, MathSciNet.  
  13. Modified Gauss-Seidel type methods and Jacobi type methods for Z-matrices.
    Li, Wen; Sun, Weiwei
    Linear Algebra Appl. 317 (2000), no. 1-3, 227--240, MathSciNet.  
  14. Jacobi and Gauss-Seidel iterations for polytopic systems: convergence via convex M-matrices.
    Stipanovi'c, Dusan M.; Siljak, Dragoslav D.
    Reliab. Comput. 6 (2000), no. 2, 123--137, MathSciNet.  
  15. On the convergence of the block nonlinear Gauss-Seidel method under convex constraints.
    Grippo, L.; Sciandrone, M.
    Oper. Res. Lett. 26 (2000), no. 3, 127--136, MathSciNet.  
  16. Fast, Block Lower-Upper Symmetric Gauss-Seidel Scheme for Arbitrary Grids
    Chen, R. F.; Wang, Z. J.
    AIAA Journal, 2000, vol. 38, no. 12, pp. 2238-2245 , Ingenta.  
  17. A nonlinear Gauss-Seidel algorithm for inference about GLMM.
    Jiang, J.
    Computational Statistics, 2000, vol. 15, no. 2, pp. 229 , Ingenta.  
  18. Post-Processing of Gauss-Seidel Iterations.
    Krizek, M.
    Numerical linear algebra with applications, 1999, vol. 6, no. 2, pp. 147 , Ingenta.  
  19. A parallel Gauss-Seidel method using NR data flow ordering.
    Kim, T.
    Applied mathematics and computation, 1999, vol. 99, no. 2/3, pp. 209 , Ingenta.  
  20. 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.  
  21. New Parallel SOR Method by Domain Partitioning.
    Xie, Dexuan; Adams, Loyce
    SIAM journal on scientific computing, 1999, vol. 20, no. 6, pp. 2261 , Ingenta.  
  22. Improved SOR Method with Orderings and Direct Methods.
    Ishiwata, E.; Muroya, Y.
    Japan journal of industrial and applied mathematics, 1999, vol. 16, no. 2, pp. 175 , Ingenta.  
  23. 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.  
  24. Gauss-Seidel and Jacobi iterative methods for the solution of systems of linear equations.
    Defez Candel, Emilio
    Implementation with DERIVE. (Spanish) Epsilon 14 (1998), no. 1(40), 27--42, MathSciNet.  
  25. Asynchronous parallel nonlinear symmetric Gauss-Seidel iteration methods. (Chinese)
    Bai, Zhong Zhi
    Math. Numer. Sin. 20 (1998), no. 2, 187--200; translation in Chinese J. Numer. Math. Appl. 20 (1998), no. 3, 75--89, MathSciNet.  
  26. A Gauss-Seidel like algorithm to solve frictional contact problems.
    Jourdan, Franck; Alart, Pierre; Jean, Michel
    Comput. Methods Appl. Mech. Engrg. 155 (1998), no. 1-2, 31--47, MathSciNet.  
  27. Basis of Eigenvectors and Principal Vectors Associated with Gauss-Seidel Matrix of A=Tridiag [-1 2 -1].
    Kohaupt, L.
    Siam review, 1998, vol. 40, no. 4, pp. 959 , Ingenta.  
  28. State Space Orderings for Gauss-Seidel in Markov Chains Revisited.
    Dayar, Tugrul
    SIAM journal on scientific computing, 1998, vol. 19, no. 1, pp. 148 , Ingenta.  
  29. 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.  
  30. Post-processing of Gauss-Seidel iterations.
    Krív zek, Michal; Liu, Liping; Neittaanmäki, Pekka
    Czech-US Workshop in Iterative Methods and Parallel Computing, Part 2 (Milovy, 1997), MathSciNet.  
  31. Necessary and sufficient conditions for global geometric convergence of block Gauss-Seidel iteration algorithm applied to Markov chains.
    Sumita, Ushio; Igaki, Nobuko
    J. Oper. Res. Soc. Japan 40 (1997), no. 3, 283--293, MathSciNet.  
  32. A generalization of the adaptive Gauss-Seidel method for Z-matrices.
    Kotakemori, Hisashi; Niki, Hiroshi; Okamoto, Naotaka
    Int. J. Comput. Math. 64 (1997), no. 3-4, 317--326, MathSciNet.  
  33. Improving the modified Gauss-Seidel method for Z-matrices.
    Kohno, Toshiyuki; Kotakemori, Hisashi; Niki, Hiroshi; Usui, Masataka
    Linear Algebra Appl. 267 (1997), 113--123, MathSciNet.  
  34. A Nonlinear Gauss-Seidel Algorithm for Noncoplanar and Coplanar Camera Calibration with Convergence Analysis.
    Chatterjee, Chanchal; Roychowdhury, Vwani P.; Chong, Edwin K.P.
    Computer vision and image understanding, 1997, vol. 67, no. 1, pp. 58 , Ingenta.  
  35. Downwind Gauss-Seidel Smoothing for Convection Dominated Problems.
    Hackbusch, W.; Probst, T.
    Numerical linear algebra with applications, 1997, vol. 4, no. 2, pp. 85 , Ingenta.  
  36. 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.  
  37. Implementation of the Multicolored SOR Method on a Vector Supercomputer.
    Fujino, Seiji; Himeno, Ryutaro; Terada, Kazuo
    IEICE transactions on information and systems, 1997, vol. 80, no. 4, pp. 518 , Ingenta.  
  38. New simple criteria for the Jacobi, Gauss-Seidel and SOR iterations.
    Huang, T.-Z.
    Z. Angew. Math. Mech. 76 (1996), no. 1, 57--58, MathSciNet.  
  39. Acceleration of Five-Point Red-Black Gauss-Seidel in Multigrid for Poisson Equation.
    Zhang, Jun
    Applied mathematics and computation, 1996, vol. 80, no. 1, pp. 73 , Ingenta.  
  40. Improved Techniques for Gap-Treating and Box-Splitting in Interval Newton Gauss-Seidel Steps for Global Optimization with Validation.
    Ratz, D.
    Zeitschrift fur angewandte mathematik und mechanik, 1996, vol. 76supp1, pp. 323 , Ingenta.  
  41. A Unified Proof for the Convergence of Jacobi and Gauss-Seidel Methods (in Classroom Notes)  
    Roberto Bagnara  
    SIAM Review, Vol. 37, No. 1. (Mar., 1995), pp. 93-97, Jstor.  
  42. Multigrid Smoothing Factors for Red-Black Gauss-Seidel Relaxation Applied to a Class of Elliptic Operators  
    Irad Yavneh  
    SIAM Journal on Numerical Analysis, Vol. 32, No. 4. (Aug., 1995), pp. 1126-1138, Jstor.  
  43. A parallel Gauss-Seidel method for block tridiagonal linear systems.
    Amodio, Pierluigi; Mazzia, Francesca
    SIAM J. Sci. Comput. 16 (1995), no. 6, 1451--1461, MathSciNet.  
  44. Gauss-Seidel relaxation on distributed-memory multiprocessors.
    Banks, Larry; Chu, Eleanor Parallel
    Proceedings of the 7th International Conference on Computing and Information, ICCI '95 (Peterborough, ON).  J. Comput. Inf. 1 (1995), no. 2, 434--450 (electronic), MathSciNet.  
  45. A Unified Proof for the Convergence of Jacobi and Gauss-Seidel Methods.
    Bagnara, Roberto
    Siam review, 1995, vol. 37, no. 1, pp. 93 , Ingenta.  
  46. The Sigma-Sor Algorithm and the Optimal Strategy for the Utilization of the Sor Iterative Method  
    Zbigniew I. Woznicki  
    Mathematics of Computation, Vol. 62, No. 206. (Apr., 1994), pp. 619-644, Jstor.  
  47. Sor-Secant Methods  
    Jose Mario Martinez  
    SIAM Journal on Numerical Analysis, Vol. 31, No. 1. (Feb., 1994), pp. 217-226, Jstor.  
  48. Gauss-Seidel Iteration for Stiff ODES from Chemical Kinetics.
    Verwer, J.G.
    SIAM journal on scientific computing, 1994, vol. 15, no. 5, pp. 1243 , Ingenta.  
  49. Adaptive Gauss-Seidel Method for Linear Systems.
    Usui, M.; Niki, H.; Kohno, T.
    International journal of computer mathematics, 1994, vol. 51, no. 1/2, pp. 119 , Ingenta.  
  50. A new sufficient condition for the convergence of the Gauss-Seidel iteration method. (Chinese)
    Wang, Xiao Hui
    Dongbei Shida Xuebao 1994, no. 1, 21--25, MathSciNet.  
  51. Improving the SOR Method.
    Li, C.-J.; Evans, D.J.
    International journal of computer mathematics, 1994, vol. 54, no. 3/4, pp. 207 , Ingenta.  
  52. 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.  
  53. The Sigma-SOR algorithm and the optimal strategy for the utilization of the SOR iterative method.
    Woznicki, Zbigniew I.
    Mathematics of computation, 1994, vol. 62, no. 206, pp. 619 , Ingenta.  
  54. Iterative Methods in Linear Algebra  
    Donald R. LaTorre   
    College Math Journal: Volume 24, Number 1, (1993),Pages: 79-88.   
  55. A modified Gauss-Seidel iteration for linear interval equations.
    Zhou, Ru-hai
    Numer. Math. J. Chinese Univ. (English Ser.) 2 (1993), no. 2, 225--233, MathSciNet.  
  56. 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.  
  57. 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.  
  58. SOR method for multistaged separation columns computations.
    Onana, A.; Hikolo, A. Mbala
    Computers & chemical engineering, 1993, vol. 17, no. 8, pp. 799 , Ingenta.  
  59. 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.  
  60. Convergence Analysis Without Regularity Assumptions for Multigrid Algorithms Based on SOR Smoothing  
    Junping Wang  
    SIAM Journal on Numerical Analysis, Vol. 29, No. 4. (Aug., 1992), pp. 987-1001, Jstor.  
  61. Gauss-Seidel Method for Least-Distance Problems.
    Li, W.; Pardalos, P.M.; Han, C.G.
    Journal of optimization theory and applications, 1992, vol. 75, no. 3, pp. 487 , Ingenta.  
  62. Some criteria for convergence of Gauss-Seidel iteration for block matrices. (Chinese)
    Zhan, Xin He; Zhang, Shu Yuan
    Dongbei Shida Xuebao 1992, no. 3, 24--26, MathSciNet.  
  63. Optimum Modified SOR (MSOR) Method in a Special Case.
    Yeyios, A.K.
    Journal of computational mathematics, 1992, vol. 10, no. 4, pp. 358 , Ingenta.  
  64. A Newton-SOR Method for Spatial Price Equilibrium.
    Marcotte, Patrice; Marquis, Gerald; Zubieta, Lourdes
    Transportation science, 1992, vol. 26, no. 1, pp. 36 , Ingenta.  
  65. Jacobi Iteration in Implicit Difference Schemes for the Wave Equation  
    D. B. Duncan, M. A. M. Lynch  
    SIAM Journal on Numerical Analysis, Vol. 28, No. 6. (Dec., 1991), pp. 1661-1679, Jstor.  
  66. Performance Characteristics of the Jacobi and the Gauss-Seidel Versions of the Auction Algorithm on the Alliant FX/8.
    Kempka, David N.; Kennington, Jeffery L.; Zaki, Hossam A.
    ORSA journal on computing, 1991, vol. 3, no. 2, pp. 92 , Ingenta.  
  67. On the Convergence of Jacobi and Gauss-Seidel Iteration for Steady-State Probabilities of Finite-State Continuous-Time Markov Chains.
    Cooper, R.B.; Gross, D.
    Communications in statistics. Stochastic models, 1991, vol. 7, no. 1, pp. 185 , Ingenta.  
  68. Diagonalizing the Adaptive SOR iteration Method.
    Dancis, Jerome
    SIAM journal on matrix analysis and applications, 1991, vol. 12, no. 4, pp. 661 , Ingenta.  
  69. 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.  
  70. Preconditioners for the Interval Gauss-Seidel Method  
    R. Baker Kearfott  
    SIAM Journal on Numerical Analysis, Vol. 27, No. 3. (Jun., 1990), pp. 804-822, Jstor.  
  71. Simulation of econometric models with the Gauss-Seidel method.
    Welfe, Aleksander; Zato'n, Wojciech
    Ekonom.-Mat. Obzor 26 (1990), no. 1, 9--26, MathSciNet.  
  72. Preconditioners for the Interval Gauss-Seidel Method.
    Kearfott, Baker R.
    SIAM journal on numerical analysis, 1990, vol. 27, no. 3, pp. 804 , Ingenta.  
  73. Multi-Sweep Asynchronous Parallel Successive Over-Relaxation for the Nonsymmetric Linear Complementarity Problem.
    De Leone, R.; Mangasarian, O.L.; Shiau, T.-H.
    Annals of operations research / RUTCOR, Rutgers Center for Operations Research, Hill Center for the Mathematical Sciences, Rutgers University, 1990, vol. 22, no. 1/4, pp. 43 , Ingenta.  
  74. Determination of the D^1/2 - Norm of the SOR Iterative Matrix for the Unsymmetric Case  
    D. J. Evans, C. Li
    Mathematics of Computation, Vol. 53, No. 187. (Jul., 1989), pp. 203-218, Jstor.  
  75. 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.  
  76. Convergence criteria for the Jacobi and Gauss-Seidel iterative methods. (Chinese)
    Gao, Yi Ming
    Numer. Math. J. Chinese Univ. 11 (1989), no. 4, 296--304, MathSciNet.  
  77. A comparison of Jacobi and Gauss-Seidel parallel iterations.
    Tsitsiklis, John N.
    Appl. Math. Lett. 2 (1989), no. 2, 167--170, MathSciNet.  
  78. Analysis of the SOR Iteration for the 9-Point Laplacian  
    Loyce M. Adams, Randall J. Leveque, David M. Young  
    SIAM Journal on Numerical Analysis, Vol. 25, No. 5. (Oct., 1988), pp. 1156-1180, Jstor.  
  79. Convergence criteria for Gauss-Seidel iteration. (Chinese)
    Zhang, Shu Yuan; Gao, Yi Ming
    Dongbei Shida Xuebao 1988, no. 4, 1--4, MathSciNet.  
  80. Round-off error analysis for the Jacobi and Gauss-Seidel iterative methods. (Romanian)
    Popa, Constantin
    Stud. Cerc. Mat. 39 (1987), no. 3, 252--260, MathSciNet.  
  81. Improving Jacobi and Gauss-Seidel iterations.
    Milaszewicz, J. P.
    Linear Algebra Appl. 93 (1987), 161--170, MathSciNet.  
  82. On the convergence of the Gauss-Seidel iteration for systems of linear algebraic equations with partitioned matrix.
    Badea, L.
    Rev. Roumaine Sci. Tech. Sér. Méc. Appl. 31 (1986), no. 4, 453--465, MathSciNet.  
  83. The Covergence Rate of a Multigrid Method with Gauss-Seidel Relaxation for the Poisson Equation  
    Dietrich Braess  
    Mathematics of Computation, Vol. 42, No. 166. (Apr., 1984), pp. 505-519, Jstor.  
  84. Estimation of the number of iterations for definite convergence condition by use of the Gauss-Seidel method.
    Taniguchi, Takeo; Kanei, Toshio
    Mem. School Engrg. Okayama Univ. 17 (1983), no. 1, 81--96, MathSciNet.  
  85. New criteria of convergence of the Jacobi, Gauss-Seidel, and SOR iterations. (Chinese)
    Lin, Pen Cheng
    Fuzhou Daxue Xuebao 1982, no. 3, 1--9, MathSciNet.  
  86. Several new criteria of convergence of Jacobi and Gauss-Seidel iteration methods. (Chinese)
    Lin, Peng Cheng
    Numer. Math. J. Chinese Univ. 5 (1983), no. 2, 185--189, MathSciNet.  
  87. Vectorisation de l'algorithme de Gauss-Seidel. (French) [Vectorizing the Gauss-Seidel algorithm]
    Bossavit, A.
    Bull. Direction Études Rech. Sér. C Math. Inform. 1981, no. 2, 3, 81--88 (1982), MathSciNet.  
  88. Remarks concerning the convergence of the Jacobi and Gauss-Seidel iterative processes for the positive definite, symmetric systems of linear equations.
    Badea, Lori
    Rev. Roumaine Math. Pures Appl. 25 (1980), no. 8, 1153--1165, MathSciNet.  
  89. Convergence of Gauss-Seidel and related sequences.
    Speck, G. P.
    New Zealand Math. Mag. 14 (1977), no. 1, 37--41, MathSciNet.  
  90. The Convergence of Jacobi and Gauss-Seidel Iteration   
    Stewart Venit   
    Mathematics Magazine: Volume 48, Number 3, (1975), Pages: 163-167, MathSciNet.     
  91. SOR-Methods for the Eigenvalue Problem with Large Sparse Matrices  
    Axel Ruhe  
    Mathematics of Computation, Vol. 28, No. 127. (Jul., 1974), pp. 695-710, Jstor.  
  92. An Extrapolated Gauss-Seidel Iteration for Hessenberg Matrices  
    L. J. Lardy  
    Mathematics of Computation, Vol. 27, No. 124. (Oct., 1973), pp. 921-926, Jstor.  
  93. Gauss-Seidel Convergence for Operators on Hilbert Space  
    John De Pillis  
    SIAM Journal on Numerical Analysis, Vol. 10, No. 1. (Mar., 1973), pp. 112-122, Jstor.  
  94. Monotone Convergence of the Sor-Newton Iterative Technique  
    Charles W. Schelin  
    SIAM Journal on Numerical Analysis, Vol. 10, No. 5. (Oct., 1973), pp. 933-938, Jstor.  
  95. Generalized Overrelaxation and Gauss-Seidel Convergence on Hilbert Space  
    Michael P. Hanna  
    Proceedings of the American Mathematical Society, Vol. 35, No. 2. (Oct., 1972), pp. 524-530, Jstor.  
  96. Coupled Harmonic Equations, SOR, and Chebyshev Acceleration  
    L. W. Ehrlich  
    Mathematics of Computation, Vol. 26, No. 118. (Apr., 1972), pp. 335-343, Jstor.  
  97. Nonlinear Generalizations of Matrix Diagonal Dominance with Application to Gauss-Seidel Iterations  
    Jorge J. More  
    SIAM Journal on Numerical Analysis, Vol. 9, No. 2. (Jun., 1972), pp. 357-378, Jstor.  
  98. On Rates of Convergence of Jacobi and Gauss-Seidel Methods for M-Functions   
    T. A. Porsching  
    SIAM Journal on Numerical Analysis, Vol. 8, No. 3. (Sep., 1971), pp. 575-582, Jstor.  
  99. Global Convergence of Newton-Gauss-Seidel Methods  
    Jorge J. More  
    SIAM Journal on Numerical Analysis, Vol. 8, No. 2. (Jun., 1971), pp. 325-336, Jstor.  
  100. On the Convergence of SOR Iterations for Finite Element Approximations to Elliptic Boundary Value Problems  
    George J. Fix, Kate Larsen  
    SIAM Journal on Numerical Analysis, Vol. 8, No. 3. (Sep., 1971), pp. 536-547, Jstor.  
  101. Jacobi and Gauss-Seidel Methods for Nonlinear Network Problems  
    T. A. Porsching  
    SIAM Journal on Numerical Analysis, Vol. 6, No. 3. (Sep., 1969), pp. 437-449, Jstor.  
  102. Remarks on the Iterative Solution of the Neumann Problem on a Rectangle by Successive Line Over-Relaxation (in Technical Notes and Short Papers)  
    Fred W. Dorr  
    Mathematics of Computation, Vol. 23, No. 105. (Jan., 1969), pp. 177-179, Jstor.  
  103. Monotone Iterations for Nonlinear Equations with Application to Gauss-Seidel Methods
    James M. Ortega, Werner C. Rheinboldt
    SIAM Journal on Numerical Analysis, Vol. 4, No. 2. (Jun., 1967), pp. 171-190, Jstor.  
  104. Nonlinear Difference Equations and Gauss-Seidel Type Iterative Methods  
    James M. Ortega, Maxine L. Rockoff  
    SIAM Journal on Numerical Analysis, Vol. 3, No. 3. (Sep., 1966), pp. 497-513, Jstor.  
  105. Estimation of the Successive Over-Relaxation Factor (in Technical Notes and Short Papers)  
    A. K. Rigler  
    Mathematics of Computation, Vol. 19, No. 90. (Apr., 1965), pp. 302-307, Jstor.  
  106. On Convergence Criteria for the Method of Successive Over-Relaxation (in Technical Notes and Short Papers)  
    C. G. Broyden  
    Mathematics of Computation, Vol. 18, No. 85. (Jan., 1964), pp. 136-141, Jstor.  
  107. On the Round-Off Error in the Method of Successive Over-Relaxation  
    M. Stuart Lynn  
    Mathematics of Computation, Vol. 18, No. 85. (Jan., 1964), pp. 36-49, Jstor.  

 

 

 

 

 

 

 

 

 

 

 

 

(c) John H. Mathews 2003