David R. Kincaid

Research Publications

Articles, Chapters, etc.

  1. David R. Kincaid, Richard S. Varga, Charles H. Warlick, "The Life and Times of David M. Young, Jr., Numerical Linear Algebra with Applications, To appear in a Special Issue Dedicated to David M. Young, 2010.
  2. David Kincaid, Richard Varga, Paul Saylor, SIAM Newsletter Article on Professor David M. Young, Jr., SIAM Newsletter, March-April 2009, page 3.
  3. Al-Kurdi, Ahmad, and David R. Kincaid, "LU-decompostion with iterative refinement for solving sparse linear systems," Journal of Computational and Applied Mathematics, 185 (2006) 391-403.
  4. Richard J. Hanson and David R. Kincaid, Notes of GMRES Algorithm Organization, Technical Report TR-05-05, Computer Sciences Department, University of Texas at Austin, March 05, 2005. [ GMRES Web page]
  5. David R. Kincaid, "Celebrating Fifty Years of David M. Young's Successive Overrelaxation Iterative Method," Numerical Mathematics and Advanced Applications, M. Feistauer, V. Dolejsi, P. Knobloch, K. Najzar (Eds.), Springer-Verlag, Berlin Heidelberg, 2004, pp. 549-558.
  6. Pilipchuk, Ludmila A., Yulia V. Malakhouskaya, David R. Kincaid, and Minghorng Lai, "Algorithms for Solving Large Sparse Underdetermined Linear Systems with Embedded Network Structures," East-West Mathematical Journal, Vol. 4, No. 2 (2002) 191-201.
  7. Kincaid, David R., David M. Young, and Jen-Yuan Chen, "Variations of the GMRES Iterative Method," Applied Numerical Mathematics (APNUM), 45 (2003) 3-10.
  8. Al-Kurdi, Ahmad, R. C. Mittal, and David R. Kincaid, "Performance of Various Preconditioned GCR(k) Algorithms Applied to Sparse Nonsymmetric Linear Systems," International Journal of Applied Science & Computations, Vol. 9, No. 1, April 2002, pp. 11-31.
  9. David R. Kincaid and Graham F. Carey, "Research on parallel methods, algorithms, and software at The University of Texas at Austin," Journal of Russian Academy of Science: Mathemtical Modelling, (Academician A.A. Samarskii, editor-in-chief), Vol. 13, No. 3, pp. 11-21, 2001.
  10. Anthony T. Chronopoulos and David Kincaid, "On the Odir iterative method for non-symmetric indefinite linear systems,"y Numerical Linear Algebra with Applications 8:71-82, 2001.
  11. David R. Kincaid, Jen-Yuan Chen, and David M. Young, "A Generalized GMRES Iterative Method," in Numerical Analysis and Its Applications , L. Vulkuo, J. Wasniewski, and P. Yalamov (editors): NAA 2000, Lecture Notes in Computer Science 1988, pp. 475-481, Springer-Verlag, Berlin 2001.
  12. David R. Kincaid, "David M. Young's Work on Iterative Methods," in International Conference on Mathematical Modeling, yBani Singh, U. S. Gupta, G. S. Srivastqava, T. R. Gulati, V. K Katiyar (editors), pp. 375-382, TATA McGraw-Hill, New Delhi, 2001.
  13. David R. Kincaid, David M. Young, and Jen-Yuan Chen, "An Overview of MGMRES and LAN/MGRES Methods for Solving Nonsymmetric Linear Systems," Taiwanese Journal of Mathematics, Vol. 4, No. 3, pp. 385-396, September 2000.
  14. David R. Kincaid, David M. Young, Jen-Yuan Chen, "An Overview of GGMRES and LAN/MGMRES Methods for Solving Nonsymmetric Systems," in Proceedings of the Mathematics Conference at Fu Jen Catholic University, Chung-Tsun Shieh, Kang C. Jea, and Tsing-Hen Ho (editors), 402-412, 2000.
  15. David M. Young and David R. Kincaid. "Partial differential equations," in Encyclopedia of Computer Science, 4th Edition. Anthony Ralston, Edwin D. Reilly, and David Hemmendinger (editors), Nature Publishers Group, New York, 2000, 1367-1370, ISBN 0-333-77879-0.
  16. Pilipchuk, Ludmila A., Yulia V. Malakhouskaya, David R. Kincaid, and Minghorng Lai, "Algorithms for Solving Large Sparse Underdetermined Linear Systems with Embedded Network Structures," East-West Mathematical Journal, submitted.
  17. Kincaid, David R., David M. Young, and Jen-Yuan Chen, "Variations of the GMRES Iterative Method," Journal of Applied Numerical Mathematics (APNUM), to appear.
  18. Al-Kurdi, Ahmad, R. C. Mittal, and David R. Kincaid, "Performance of Various Preconditioned GCR(k) Algorithms Applied to Sparse Nonsymmetric Linear Systems," International Journal of Applied Science & Computations, Vol. 9, No. 1, April 2002, pp. 11-31.
  19. David R. Kincaid and Graham F. Carey, Research on parallel methods, algorithms, and software at The University of Texas at Austin, Journal of Russian Academy of Science: Mathemtical Modelling, (Academician A.A. Samarskii, editor-in-chief), Vol. 13, No. 3, pp. 11-21, 2001.
  20. Anthony T. Chronopoulos and David Kincaid, On the Odir iterative method for non-symmetric indefinite linear systems, Numerical Linear Algebra with Applications 8:71-82, 2001.
  21. David R. Kincaid, Jen-Yuan Chen, and David M. Young, A Generalized GMRES Iterative Method, in Numerical Analysis and Its Applications , L. Vulkuo, J. Wasniewski, and P. Yalamov (editors): NAA 2000, Lecture Notes in Computer Science 1988, pp. 475-481, Springer-Verlag, Berlin 2001.
  22. David R. Kincaid, David M. Young's Work on Iterative Methods, in International Conference on Mathematical Modeling, Bani Singh, U. S. Gupta, G. S. Srivastqava, T. R. Gulati, V. K Katiyar (editors), pp. 375-382, TATA McGraw-Hill, New Delhi, 2001.
  23. David R. Kincaid, David M. Young, and Jen-Yuan Chen, An Overview of MGMRES and LAN/MGRES Methods for Solving Nonsymmetric Linear Systems, Taiwanese Journal of Mathematics, Vol. 4, No. 3, pp. 385-396, September 2000.
  24. David R. Kincaid, David M. Young, Jen-Yuan Chen, An Overview of GGMRES and LAN/MGMRES Methods for Solving Nonsymmetric Systems, In Proceedings of the Mathematics Conference at Fu Jen Catholic University, Chung-Tsun Shieh, Kang C. Jea, and Tsing-Hen Ho (editors), 402-412, 2000.
  25. David M. Young and David R. Kincaid. Partial differential equations, In Encyclopedia of Computer Science, 4th Edition. Anthony Ralston, Edwin D. Reilly, and David Hemmendinger (editors), Nature Publishers Group, 2000, 1367-1370, ISBN 0-333-77879-0.
  26. Jen-Yuan Chen, David R. Kincaid, and David M. Young. Generalization and Modifications of the GMRES Iterative Method. Numerical Algorithms. 21(1999) 119-146.
  27. David R. Kincaid. Work on Iterative Methods by David M. Young at The University of Texas at Austin. In Iterative Methods in Scientific Computations IV, David R. Kincaid and Anne C. Elster (editors), IMACS, New Brunswick, NJ, 1999, 9-24.
  28. David R. Kincaid A Modified GMRES Iterative Method, Proceedings 16th IMACS World Congress 2000 on Scientific Computations in Applied Mathematics and Simulation, IMACS, New Brunswick, NJ, 2000. [CD ROM]
  29. Jen-Yuan Chen, David R. Kincaid, and David M. Young. GGMRES iterative method. In Iterative Methods in Scientific Computation, Junping Wang, Myron B. Allen III, Benito M. Chen, and Tarek Mathew (editors), pages 21-26. IMACS, New Brunswick, 1998.
  30. Jen-Yuan Chen, David R. Kincaid, and David M. Young. MGMRES iterative method. In Iterative Methods in Scientific Computation, Junping Wang, Myron B. Allen III, Benito M. Chen, and Tarek Mathew (editors), pages 15-20. IMACS, New Brunswick, 1998.
  31. Asha Nallana and David R. Kincaid. A Cray T3D performance study. In Numerical Analysis and Its Applications, Jerzy Wasniewski Lubin Vulkov and Plamen Yalamov (editors), pages 349-356. Springer-Verlag, 1997.
  32. David R. Kincaid and David M. Young. Note on parallel alternating-type iterative methods. In Iterative Methods in Linear Algebra II, S. D. Margenov and P. S. Vassilevski (editors), pages 131-139. IMACS, New Brunswick, 1996.
  33. David M. Young and David R. Kincaid. Parallel implementation of a class of nonstationary alternating-type methods. In Proceedings of the Third International Colloquium on Numerical Analysis, D. Bainov and V. Covachev (editors), pages 219-222. VSP, Utrecht, The Netherlands, 1995.
  34. David R. Kincaid and David M. Young. Linear stationary second-degree methods for solution of large linear systems. In Topics in Polynomials of One and Several Variables and Their Applications, Th. M. Rassias, H. M. Srivasiava, and A. Yanushauska (editors), pages 609-629. World Scientific Publishers, River Edge, NJ, 1993.
  35. David R. Kincaid and David M. Young. Stationary second-degree iterative methods and recurrences. In Iterative Methods in Linear Algebra, R. Beauwens and R. De Groen (editors), pages 27-47. Elsevier Science Publishers B.V. (North-Holland), New York, 1992.
  36. Malathi Ramdas and David R. Kincaid. Parallelizing ITPACK 2D for the Cray Y-MP. In Iterative Methods in Linear Algebra, R. Beauwens and R. De Groen (editors), pages 323-337. Elsevier Science Publishers B.V. (North-Holland), New York, 1992.
  37. David R. Kincaid, Thomas C. Oppe, and Wayne D. Joubert. An overview of NSPCG: A nonsymmetric preconditioned conjugate gradient package. In Practical Iterative Methods for Large Scale Computations, Daniel L. Boley, Donald G. Truhlar, Youcef Saad, Robert E. Wyatt, and Lee A. Collins (editors), pages 283-293. North-Holland, Amsterdam, 1989. (Reprinted from Computer Physics Communications, 53(3):283-293, 1989.).
  38. David R. Kincaid and Thomas C. Oppe. Some parallel algorithms on the four processor Cray X-MP4 supercomputer. In Parallel Supercomputing: Methods, Graham F. Carey (editor), Algorithms and Applications, Chapter 5, pages 121-134. Wiley, New York, 1989.
  39. David R. Kincaid, Thomas C. Oppe, John R. Respess, and David M. Young. ITPACK solution modules. In Solving Elliptic Problems Using ELLPACK, John R. Rice and Ronald F. Boisvert (editors), Chapter 7, pages 121-146. Springer-Verlag, New York, 1985.
  40. David M. Young, David R. Kincaid, and Kang C. Jea. Accelerating nonsymmetric iterative methods. In Elliptic Problem Solvers II, Garrett Birkhoff and Arthur Schoenstadt (editors), pages 323-342. Academic Press, New York, NY, 1984.
  41. David R. Kincaid and David M. Young. The ITPACK project: Past, present, and future. In Elliptic Problem Solvers II, Garrett Birkhoff and Arthur Schoenstadt (editors), pages 53-63. Academic Press, New York, 1984.
  42. David R. Kincaid and David M. Young. Adapting iterative algorithms developed for symmetric systems to nonsymmetric systems. In Elliptic Problem Solvers, Martin Schultz (editor), pages 353-359. Academic Press, New York, 1981.
  43. David M. Young and David R. Kincaid. The ITPACK package for large sparse linear systems. In Elliptic Problem Solvers, Martin Schultz (editor), pages 163-185. Academic Press, New York, 1981.
  44. David R. Kincaid and David M. Young. Survey of iterative methods. In Encyclopedia of Computer Sciences and Technology, Jack Belzer, Albert G. Holzman, and Allen Kent (editors), volume 13, pages 354-391. Marcel Dekker, Inc., New York, 1979.
  45. David R. Kincaid and Anne C. Elster. Iterative methods symposium honors David M. Young, Jr. IEEE Computational Science & Engineering, 5:12-15, 1998.
  46. David M. Young and David R. Kincaid. A new class of parallel alternating-typle iterative methods. Journal of Computational and Applied Mathematics, 74:331-344, 1996.
  47. Thomas C. Oppe and David R. Kincaid. Iterative BLAS. Journal of Applied Science & Computations, 1(3):494-520, 1995.
  48. David R. Kincaid. Stationary second-degree iterative methods. Applied Numerical Mathematics, 16:227-237, 1994.
  49. Marilyn Santiago and David R. Kincaid. Using cyclic reduction on a parallel computer to improve the performance of an underwater sound implicit finite difference model. Computers in Mathematical Applications, 21(5):83-94, 1991.
  50. David R. Kincaid, Thomas C. Oppe, and Wayne D. Joubert. An overview of NSPCG: A nonsymmetric preconditioned conjugate gradient package. Computer Physics Communications, 53(3):283-293, 1989.
  51. David R. Kincaid, Thomas C. Oppe, and Wayne D. Joubert. An introduction to the NSPCG software package. International Journal of Numerical Methods in Engineering, 27(3):589-608, 1989.
  52. David R. Kincaid and David M. Young. A brief review of the ITPACK project. Journal of Computational and Applied Mathematics, 24:121-127, 1988.
  53. David R. Kincaid and Thomas C. Oppe. A parallel algorithm for the general LU factorization. Communications in Applied Numerical Methods, 4(3):349-359, 1988.
  54. Thomas C. Oppe and David R. Kincaid. The performance of ITPACK on vector computers for solving large sparse linear systems arising in sample oil reservoir simulation problems. Communications in Applied Numerical Methods, 3(1):23-29, 1987.
  55. David R. Kincaid, Thomas C. Oppe, and David M. Young. Vectorized iterative methods for partial differential equations. Communications in Applied Numerical Methods, 2(3):289-296, 1986.
  56. David R. Kincaid, Thomas C. Oppe, and David M. Young. Vector computations for sparse linear systems. SIAM J. Alg. Disc. Math., 7(1):99-112, 1986.
  57. David R. Kincaid, John R. Respess, David M. Young, and Roger G. Grimes. ITPACK 2C: A Fortran package for solving large sparse linear systems by adaptive accelerated iterative methods. ACM Transactions on Mathematical Software, 8(3):302-322, 1982. Algorithm 586.
  58. C. L. Lawson, R. J. Hanson, D. R. Kincaid, and F. T. Krogh. Basic linear algebra subprograms for Fortran usage. ACM Transactions on Mathematical Software, 5(3):308-323, 1979.
  59. David R. Kincaid, Roger G. Grimes, and David M. Young. The use of iterative methods for solving large sparse PDE-related linear systems. Mathematics and Computers in Simulation, XXI:368-375, 1979.
  60. David R. Kincaid and David M. Young. The development of a computer package for solving a class of partial differential equations by iterative methods. Annales de l'Association Internationale pour le Calcul Analogique, 3:186-191, 1975.
  61. David R. Kincaid. On complex second-degree iterative methods. SIAM J. Numer. Anal., 11(2):211-218, 1974.
  62. David R. Kincaid. A class of norms of iterative methods for solving systems of linear equations. Numer. Math., 20:392-408, 1973.
  63. David R. Kincaid and David M. Young. The modified successive overrelaxation method with fixed parameters. Math. Comp., 26(119):705-717, 1972.
  64. David R. Kincaid. Norms of the successive overrelaxation method. Math. Comp., 26(118):345-357, 1972.
  65. David R. Kincaid, Linda J. Hayes, and David M. Young. ITPACK: Then and now. In IMACS 13th World Congress on Computational and Applied Mathematics, 1994.
  66. David R. Kincaid, Linda J. Hayes, and David M. Young. ITPACK: Past, present, and future. In Colorado Conference on Iterative Methods, volume 1, Boulder, CO, 1994. University of Colorado & Front Range Scientific Computations, Inc.
  67. David R. Kincaid and Matthew D. Fassiotto. ITPACK software and parallelization. In Advances in Computer Methods for Partial Differential Equations, D. Knight R. Vichnevetsky and G. Richter (editors), volume VII, pages 425-430. IMACS, Department of Computer Sciences, Rutgers University, New Brunswick, NJ, 1992.
  68. David R. Kincaid and Malathi Ramdas. Paralleling ITPACKV 2D. In IMACS '91: Proceedings of the 13th IMACS World Congress on Computational and Applied Mathematics, J. J. H. Miller and R. Vichnevetsky (editors), volume 2, pages 686-687. Criterion Press, Dublin, Ireland, 1991.
  69. David R. Kincaid and Thomas C. Oppe. Recent vectorization and parallelization of ITPACK. In Preconditioned Conjugate Gradient Methods, O. Axelsson and L. Y. Kolotilina (editors), pages 58-78. Springer-Verlag, New York, 1990. Lecture Notes in Mathematics 1457.
  70. David R. Kincaid, Graham F. Carey, Kamy Sepehrnoori, and David M. Young. Vector and parallel iterative solution of large sparse systems for PDE's. In Science and Engineering on Cray Supercomputers, pages 25-44. Cray Research, Inc., Minneapolis, MN, 1988.
  71. Thomas C. Oppe and David R. Kincaid. Parallel LU-factorization algorithms for dense matrices. In Supercomputing, E. N. Houstis, T. S. Papatheodorou, and C. D. Polychronopoulos (editors), pages 576-594. Springer-Verlag, New York, 1988. Lecture Notes in Computer Science 297.
  72. Thomas C. Oppe and David R. Kincaid. Numerical experiments with a parallel conjugate gradient method. In Advances in Computer Methods for Partial Differential Equations, R. Vichnevetsky and R. S. Stepleman (editors), volume VI, pages 369-374. IMACS, Department of Computer Sciences, Rutgers University, New Brunswick, NJ, 1987.
  73. David R. Kincaid and David M. Young. A tutorial on finite difference methods and ordering of mesh points. In Fall Joint Computer Conference Proceedings, H. S. Stone and S. Winkler (editors), pages 556-559. IEEE Computer Society Press, Washington, D.C., 1986.
  74. David M. Young, Linda J. Hayes, Thomas C. Oppe, and David R. Kincaid. On the use of vector computers for solving sparse linear systems. In Proceedings of the Conference Vector and Parallel Processors for Scientific Computation. Accademia dei Lincei, Roma, Italy, May 1985.
  75. David M. Young and David R. Kincaid. On the use of iterative methods with supercomputers for solving partial differential equations. In Trends in the Theory and Practice of Non-linear Analysis, V. Lakshmikantham (editor), pages 455-466, The Netherlands, 1984. Elsevier Science Publishers (North-Holland).
  76. David M. Young and David R. Kincaid. The ITPACK software package. In PDE Software: Modules, Interfaces and Systems, B. Engquist and T. Smedsass (editors), pages 193-206. Elsevier Science Publishers (North-Holland), Amsterdam, The Netherlands, 1984.
  77. David R. Kincaid, Graham F. Carey, Thomas C. Oppe, Kamy Sepehrnoori, and David M.Young. Combining finite element and iterative methods for solving partial differential equations on advanced computer architectures. In Advances in Computer Methods for Partial Differential Equations, R. Vichnevetsky and R. S. Stepleman (editors), volume V, pages 375-378. IMACS, Department of Computer Science, Rutgers University, New Brunswick, NJ, 1984.
  78. David R. Kincaid and David M. Young. Adapting iterative algorithms for solving large sparse linear systems for efficient use on the CDC CYBER 205. In CYBER 200 Applications Seminar, pages 147-160. NASA Scientific and Technical Information Research, Washington, D.C., 1983. NASA Conference Publication 2295.
  79. David R. Kincaid and Thomas C. Oppe. ITPACK on supercomputers. In Numerical Methods, V. Pereyra and A. Reinoza (editors), pages 151-161, New York, 1983. Springer-Verlag. Lecture Notes in Mathematics 1005.
  80. David R. Kincaid, Thomas C. Oppe, and David M. Young. Adapting ITPACK routines for use on a vector computer. In Proceedings: Symposium on CYBER 205 Applications. Colorado State University, Fort Collins, CO, August 1982.
  81. David R. Kincaid. Acceleration parameters for a symmetric successive overrelaxation conjugate gradient method for nonsymmetric systems. In Advances in Computer Methods for Partial Differential Equations, R. Vichnevetsky and R. S. Stepleman (editors), volume IV, pages 294-299. IMACS, Department of Computer Science, Rutgers University, New Brunswick, NJ, 1981.
  82. D. Kincaid, S. Eisenstat, A. George, R. Grimes, and A. Sherman. Some comparisons of software packages for large sparse linear systems. In Advances in Computer Methods for Partial Differential Equations, R. Vichnevetsky and R. S. Stepleman (editors), volume III, pages 98-106. IMACS, Department of Computer Science, Rutgers University, New Brunswick, NJ, 1979.
  83. David R. Kincaid, David M. Young, and Roger G. Grimes. The use of iterative methods for solving large sparse PDE-related linear systems. In Advances in Computer Methods for Partial Differential Equations, R. Vichnevetsky and R. S. Stepleman (editors), volume III, pages 29-32. IMACS, Department of Computer Science, Rutgers University, New Brunswick, NJ, 1979.
  84. David R. Kincaid, Roger G. Grimes, William I. MacGregor, and David M. Young. ITPACK: Adaptive iterative algorithms using symmetric sparse storage. In Symposium on Reservoir Simulation, volume SPE 7687, pages 151-170. Society of Petroleum Engineers of AIME, Dallas, TX, 1979.

    85. Technical Reports

  85. David R. Kincaid and Anne C. Elster. Symposium on Iterative Methods for Scientific Computation. Report CNA-287, University of Texas at Austin, Center for Numerical Analysis, October 1998.
  86. Jen-Yuan Chen, David R. Kincaid, and David M. Young. Generalizations and modificaitons of the GMRES iterative method. Report CNA-286, University of Texas at Austin, Center for Numerical Analysis, July 1997.
  87. Asha Nallana and David R. Kincaid. A Cray performance study. Report CNA-283, University of Texas at Austin, Center for Numerical Analysis, May 1996.
  88. David M. Young and David R. Kincaid. A new class of parallel alternating-typle iterative methods. Report CNA-282, University of Texas at Austin, Center for Numerical Analysis, May 1996.
  89. David M. Young and David R. Kincaid. A note on parallel alternating-type iterative methods. Report CNA-276, University of Texas at Austin, Center for Numerical Analysis, June 1995.
  90. David M. Young and David R. Kincaid. On the parallel implementation of alternating-type iterative methods. Report CNA-277 (revised), University of Texas at Austin, Center for Numerical Analysis, August 1995.
  91. David R. Kincaid and Matthew D. Fassiotto. ITPACK software and parallelization. Report CNA-255, University of Texas at Austin, Center for Numerical Analysis, June 1992.
  92. David R. Kincaid and David M. Young. Stationary second-degree iterative methods and recurrences. Report CNA-250, University of Texas at Austin, Center for Numerical Analysis, February 1991.
  93. Malathi Ramdas and David R. Kincaid. Parallelizing ITPACKV 2D for the Cray Y-MP. Report CNA-249, University of Texas at Austin, Center for Numerical Analysis, February 1991.
  94. David R. Kincaid and David M. Young. Linear stationary second-degree methods for solution of large linear systems. Report CNA-244, University of Texas at Austin, Center for Numerical Analysis, July 1990.
  95. Thomas C. Oppe and David R. Kincaid. Are there iterative BLAS? Report CNA-240, University of Texas at Austin, Center for Numerical Analysis, February 1990.
  96. David R. Kincaid, Thomas C. Oppe, and David M. Young. ITPACKV 2D user's guide. Report CNA-232, University of Texas at Austin, Center for Numerical Analysis, May 1989.
  97. David R. Kincaid, Thomas C. Oppe, and Wayne D. Joubert. An overview of NSPCG: A nonsymmetric preconditioned conjugate gradient package. Report CNA-228, University of Texas at Austin, Center for Numerical Analysis, October 1988.
  98. David R. Kincaid, Graham F. Carey, Kamy Sepehrnoori, and David M. Young. Vector and parallel iterative solution of large sparse systems for PDEs. Report CNA-222, University of Texas at Austin, Center for Numerical Analysis, August 1988.
  99. David R. Kincaid and Thomas C. Oppe. Some parallel algorithms on the four processor Cray X-MP4 supercomputer. Report CNA-220, University of Texas at Austin, Center for Numerical Analysis, May 1988.
  100. Thomas C. Oppe, Wayne D. Joubert, and David R. Kincaid. NSPCG user's guide, version 1.0: A package for solving large sparse linear systems by various iterative methods. Report CNA-216, University of Texas at Austin, Center for Numerical Analysis, April 1988.
  101. David R. Kincaid and Thomas C. Oppe. A comparison study of iterative solution methods for sample oil reservoir simulation problems on vector computers. Report CNA-200, University of Texas at Austin, Center for Numerical Analysis, August 1985.
  102. David R. Kincaid, Thomas C. Oppe, John R. Respess, and David M. Young. ITPACKV 2C user's guide. Report CNA-191, University of Texas at Austin, Center for Numerical Analysis, February 1984.
  103. David R. Kincaid, Thomas C. Oppe, and David M. Young. Vector computations for sparse linear systems. Report CNA-189, University of Texas at Austin, Center for Numerical Analysis, February 1984.
  104. David M. Young, K. C. Jea, and David R. Kincaid. Accelerating nonsymmetrizable iterative methods. Report CNA-181, University of Texas at Austin, Center for Numerical Analysis, March 1983.
  105. David R. Kincaid and David M. Young. The ITPACK project: Past, present, and future. Report CNA-180, University of Texas at Austin, Center for Numerical Analysis, March 1983.
  106. David R. Kincaid, Tom Oppe, and David M. Young. Adapting ITPACK routines for use on a vector computer. Report CNA-177, University of Texas at Austin, Center for Numerical Analysis, August 1982.
  107. David R. Kincaid, Roger G. Grimes, John R. Respess, and David M. Young. ITPACK 2B: A Fortran package for solving large sparse linear systems by adaptive accelerated iterative methods. Report CNA-173, University of Texas at Austin, Center for Numerical Analysis, September 1981. (Also, Report CCSN-44, Computation Center, University of Texas at Austin.).
  108. David R. Kincaid, Roger G. Grimes, and David M. Young. ITPACK 2A: A Fortran implementation of adaptive accelerated iterative methods for solving large sparse linear systems. Report CNA-164, University of Texas at Austin, Center for Numerical Analysis, October 1980.
  109. Roger G. Grimes, David R. Kincaid, and David M. Young. ITPACK 2.0 user's guide. Report CNA-150, University of Texas at Austin, Center for Numerical Analysis, August 1978.
  110. Roger G. Grimes, David R. Kincaid, William I. MacGregor, and David M. Young. ITPACK report: Adaptive iterative algorithms using symmetric sparse storage. Report CNA-139, University of Texas at Austin, Center for Numerical Analysis, August 1978.
  111. David R. Kincaid and Roger G. Grimes. ITPACK report: Numerical studies of several adaptive iterative algorithms. Report CNA-126, University of Texas at Austin, Center for Numerical Analysis, August 1977.
  112. David R. Kincaid. Numerical results of the application of complex second-degree and semi-iterative methods. Report CNA-90, University of Texas at Austin, Center for Numerical Analysis, September 1974.
  113. David M. Young and David R. Kincaid. Linear stationary second-degree methods for the solution of large linear systems. Report CNA-52, University of Texas at Austin, Center for Numerical Analysis, October 1972.
  114. David M. Young and David R. Kincaid. The modified successive overrelaxation method with fixed parameters. Report CNA-33, University of Texas at Austin, Center for Numerical Analysis, October 1971.
  115. David R. Kincaid and David M. Young. Norms of the successive overrelaxation method. Report CNA-26, University of Texas at Austin, Center for Numerical Analysis, July 1971.
  116. David R. Kincaid. A class of norms of iterative methods for solving systems of linear equations. Report CNA-24, University of Texas at Austin, Center for Numerical Analysis, June 1971.
  117. David R. Kincaid. Extrapolated, semi-iterative and second-degree methods for systems of linear equations. Report CNA-23, University of Texas at Austin, Center for Numerical Analysis, June 1971.
  118. David R. Kincaid. An analysis of a class of norms of iterative methods for systems of linear equations. Report CNA-18, University of Texas at Austin, Center for Numerical Analysis, May 1971. Ph.D. thesis.
  119. David M. Young and David R. Kincaid. Norms of the successive overrelaxation method and related methods. Report TNN-94, University of Texas at Austin, Computation Center, September 1969.

    120. Dissertation & Thesis

  120. David R. Kincaid. An Analysis of a Class of Norms of Iterative Methods for Systems of Linear Equations. PhD thesis, University of Texas at Austin, May 1971. Also, Report CNA-18, Center for Numerical Analysis.
  121. David R. Kincaid. Algorithmic Procedures for Computing the Greatest Common Divisor of n Integers. Master's thesis, University of Texas at Austin, May 1967.
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10 October 2009