1. STEVEN F. ASHBY, MIKE HOLST, TOM MANTEUFFEL, PAUL SAYLOR, The role of the inner product in stopping criteria for conjugate gradient iterations, BIT, 41(2001), pp. 26-53.

  2. F. DOUGLAS SWESTY, PAUL SAYLOR, DENNIS C. SMOLARSKI S.J., AND E. Y. M. WANG, Scalable, Hydrodynamic and Radiation-Hydrodynamic Studies of Neutron Stars Mergers, Supercomputing 97, San Jose, CA, Nov 15-21.

  3. S. F. ASHBY, S. L. LEE, L. R. PETZOLD, P. E. SAYLOR, AND E. SEIDEL, Computing spacetime curvature via differential-algebraic equations. Appl. Numer. Math., 20 (1996), pp. 221--234.

  4. P. CONCUS AND P. SAYLOR, A modified direct preconditioner for indefinite symmetric Toeplitz systems, Numerical Linear Algebra, 2(50), 415-430 (1995).

  5. S. F. ASHBY, C. T. KELLEY, P. E. SAYLOR, AND J. S. SCROGGS, Preconditioning via asymptotically-defined domain decomposition, in Proceedings of the Seventh International Conference on Domain Decomposition Methods in Science and Engineering, D. E. Keyes and J. Xu, eds., Providence, October 1995, AMS.

    Held at Pennsylvania State University, October 27-30, 1993.

  6. P. E. SAYLOR AND D. C. SMOLARSKI, Implementation of an adaptive algorithm for Richardson's method, Linear Algebra Appl., 154--156 (1991), pp. 615--646.

  7. S. F. ASHBY, T. A. MANTEUFFEL, AND P. E. SAYLOR, A taxonomy for conjugate gradient methods, SIAM J. Numer. Anal., 27 (1990), pp. 1542--1568.