# Stephen H. Brill

*A New Basis for the Solution of the One-Dimensional Transport Equation*by Stephen H. Brill

The XVI International Conference on Computational Methods in Water Resources.

Copenhagen, Denmark.

18-22 June 2006.*Analytical Solution of the Hermite Collocation Discretization of a Differential Equation*by Stephen H. Brill

University of Massachusetts Boston, Mathematics Department Seminar.

Boston, Massachusetts.

17 October 2005.*Optimal Collocation Solution of the One-Dimensional Steady-State Convection-Diffusion Equation with Variable Coefficients*by Stephen H. Brill

Hawaii International Conference on Statistics, Mathematics and Related Fields.

Honolulu, Hawaii.

9-11 January 2005.*Optimal Collocation Solution of the One-Dimensional Steady-State Convection-Diffusion Equation with Variable Coefficients*by Stephen H. Brill

INRA (Inland Northwest Research Alliance) Environmental & Subsurface Science Symposium.

Spokane, Washington.

20-22 September 2004.*Optimal Collocation Solution of the One-Dimensional Steady-State Convection-Diffusion Equation with Variable Coefficients*by Stephen H. Brill

The XV International Conference on Computational Methods in Water Resources.

Chapel Hill, North Carolina.

13-17 June 2004.*Accurate Upstream Collocation Solution of the One-Dimensional Steady-State Convection-Diffusion Equation with Variable Coefficients*by Stephen H. Brill

INRA (Inland Northwest Research Alliance) Subsurface Science Symposium.

Salt Lake City, Utah.

6-8 October 2003.*Accurate Upstream Collocation Solution of the One-Dimensional Steady-State Convection-Diffusion Equation with Variable Coefficients*by Stephen H. Brill

Seventh U.S. National Congress on Computational Mechanics.

Albuquerque, New Mexico.

28-30 July 2003.*Accurate Upstream Collocation Solution of the One-Dimensional Steady-State Convection-Diffusion Equation with Variable Coefficients*by Stephen H. Brill

Conference on the Mathematics of Finite Elements and Applications.

Uxbridge, United Kingdom.

21-24 June 2003.*Optimal Collocation Solution of Steady-State Convection-Diffusion Equations*by Stephen H. Brill

INRA (Inland Northwest Research Alliance) Subsurface Science Symposium.

Boise, Idaho.

13-16 October 2002.*Analytical Upstream Collocation Solution of Steady-State Convection-Diffusion Equations*by Stephen H. Brill

The XIV International Conference on Computational Methods in Water Resources.

Delft, The Netherlands.

23-28 June 2002.*Optimal Upstream Collocation Solution of a Convection-Diffusion Equation*by Stephen H. Brill

INRA (Inland Northwest Research Alliance) Subsurface Science Symposium.

Idaho Falls, Idaho.

6-7 September 2001.*Optimal Upstream Collocation Solution of the One-Dimensional Steady-State Convection-Diffusion Equation*by Stephen H. Brill

Third International ISAAC (The International Society for Analysis, its Applications and Computation) Congress.

Berlin, Germany.

20-25 August 2001.*Solving Multiphase Equations from a Dynamical Systems Point of View*by Stephen H. Brill

Eighth Biannnual Unsaturated Zone Interest Group Meeting.

Idaho Falls, Idaho.

30 July - 2 August 2001.*Analytical Solution of Hermite Collocation Discretization of Differential Equations*by Stephen H. Brill

University of Montana, Department of Mathematical Sciences Colloquium.

Missoula, Montana.

16 March 2001.*The Solution of Two-Dimensional Partial Differential Equations via Hermite Collocation with Preconditioned Krylov Methods*by Stephen H. Brill

Boise State University, Department of Mathematics and Computer Science Colloquium.

Boise, Idaho.

28 September 2000.*The Solution of Two-Dimensional Partial Differential Equations via Hermite Collocation with Block Red-Black Gauss-Seidel Preconditioner*by Stephen H. Brill

Invited lecture at the Ninth International Colloquium on Numerical Analysis and Computer Science with Applications.

Plovdiv, Bulgaria.

12-17 August 2000.*Solving Multiphase Equations from a Dynamical Systems Point of View*by Stephen H. Brill

The XIII International Conference on Computational Methods in Water Resources.

Calgary, Alberta, Canada.

25-29 June 2000.*Solving Multiphase Equations from a Dynamical Systems Perspective*by Stephen H. Brill

American Geophysical Union, 1999 Fall Meeting.

San Francisco, California.

13-17 December 1999.*The Bi-CGTAB Method with Red-Black Gauss-Seidel Preconditioner Applied to the Hermite Collocation Discretization of Subsurface Multiphase Flow and Transport Problems*by Stephen H. Brill, Joseph F. Guarnaccia, and George F. Pinder

The XII International Conference on Computational Methods in Water Resources.

Crete, Greece.

15-19 June 1998.*Parallel Implementation of the Bi-CGSTAB Method for the Hermite Collocation Discretization for Partial Differential Equations*by Stephen H. Brill

Boise State University, Department of Mathematics and Computer Science Colloquium.

Boise, Idaho.

27 February 1998.*Parallel Implementation of the Bi-CGSTAB Method for the Hermite Collocation Discretization for Partial Differential Equations*by Stephen H. Brill

Middlebury College, Department of Mathematics and Computer Science Seminar.

Middlebury, Vermont.

11 November 1997.*Parallel Implementation of the Preconditioned Bi-Conjugate Gradient Method Applied to the Hermite Collocation Discretization of Partial Differential Equations*by Stephen H. Brill

Fourth Annual Meeting, Research Center for Groundwater Remediation Design.

Burlington, Vermont.

25-26 July 1997.*Parallel Implementation of the Preconditioned Bi-Conjugate Gradient Method Applied to the Hermite Collocation Discretization of Partial Differential Equations*by Stephen H. Brill

Mathematical Association of America, Northeastern Section, Spring Meeting.

North Andover, Massachusetts.

6-7 June 1997.*A Parallel Preconditioned Bi-Conjugate Gradient Algorithm for Two-Dimensional Elliptic and Parabolic Equations Using Hermite Collocation*by Stephen H. Brill and George F. Pinder

The Eighth SIAM Conference on Parallel Processing for Scientific Computing.

Minneapolis, Minnesota.

14-17 March 1997.*A Block Red-Black SOR Method for a Two-Dimensional Parabolic Equation Using Hermite Collocation*by Stephen H. Brill and George F. Pinder

Third Annual Meeting, Research Center for Groundwater Remediation Design.

Burlington, Vermont.

21-22 August 1996.