Teresa Bailey
- Program Years: 2002-2006
- Academic Institution: Texas A&M University
- Field of Study: Engineering
- Academic Advisor: Marvin Adams
- Practicum(s):
Lawrence Livermore National Laboratory (2004)
Oak Ridge National Laboratory (2005) - Degree(s):
Ph.D. Nuclear Engineering, Texas A&M University, 2008
M.S. Nuclear Engineering, Texas A&M University, 2006
B.S. Nuclear Engineering, Oregon State University, 2002
Current Status
- Status: Deterministic Transport Project Lead, Lawrence Livermore National Laboratory
- Research Area: Deterministic Transport Theory
Publications
T.S. Bailey, J.E. Morel, and J.H. Chang, “Asymptotic Diffusion-Limit Accuracy on Sn Angular Differencing Schemes,” Nuclear Science and Engineering, 165 (2010) 149-169T.S. Bailey, M.L. Adams, T.B. Yang, and M.R. Zika, “A Piecewise Linear Finite Element Discretization of the Diffusion Equation for Arbitrary Polyhedral Grids,” Journal of Computational Physics 227 (2008) 3738-3757
S. D. Pautz, T. S. Bailey, “Parallel Deterministic Transport Sweeps of Structured and Unstructured Meshes with Overloaded Mesh Decompositions,” Proc. Joint International Conference on Mathematics and Computation, Supercomputing in Nuclear Applications and the Monte Carlo Method, April 19-23, Nashville, TN (2015), CD-ROM
M. P. Adams, M. L. Adams, C. N. McGraw, A. T. Till, T. S. Bailey, “Provably Optimal Parallel Transport Sweeps with Non-Contiguous Partitions,” in Proc. Joint International Conference on Mathematics and Computation, Supercomputing in Nuclear Applications and the Monte Carlo Method, April 19-23, Nashville, TN (2015), CD-ROM
A. J. Kunen, T. S. Bailey, P. N. Brown, “KRIPKE – A Massively Parallel Transport Mini-App,” in Proc. Joint International Conference on Mathematics and Computation, Supercomputing in Nuclear Applications and the Monte Carlo Method, April 19-23, Nashville, TN (2015), CD-ROM
T.S. Bailey, J.S. Warsa, J.H. Chang, and M.L. Adams, “Thick Diffusion Limit Boundary Layer Test Problems,” in Proc. International Conference on Mathematics and Computational Methods Applied to Nuclear Science and Engineering, May 5-9, 2013, Sun Valley, ID (2013), CD-ROM
T.A. Brunner, T.V. Kolev, T.S. Bailey, and A.T.Till, “Perserving Spherical Symmetry in Axisymmetric Coordinates for Diffusion,” in Proc. International Conference on Mathematics and Computational Methods Applied to Nuclear Science and Engineering, May 5-9, 2013, Sun Valley, ID (2013), CD-ROM
M.P. Adams, M.L. Adams, W.D. Hawkins, T. Smith, L. Rauchwerger, N.M. Amato, T.S. Bailey, and R.D. Falgout, “Provably Optimal Parallel Transport Sweeps on Regular Grids,” in Proc. International Conference on Mathematics and Computational Methods Applied to Nuclear Science and Engineering, May 5-9, 2013, Sun Valley, ID (2013), CD-ROM
T.S. Bailey, J.S. Warsa, J.H. Chang and M.L. Adams, “A Piecewise Bi-Linear Discontinuous Finite Element Spatial Discretization of the Sn Transport Equation,” in Proc. International Conference on Mathematics and Computational Methods Applied to Nuclear Science and Engineering, May 8-12, 2011, Rio de Janeiro, Brazil (2011), CD-ROM
T.S. Bailey, M.L. Adams, J.H. Chang, and J.S. Warsa, “A Piecewise Linear Discontinuous Finite Element Spatial Discretization of the Transport Equation in 2D Cylindrical Geometry,” in Proc. International Conference on Mathematics, Computational Methods & Reactor Physics, May 3-7, 2009, Saratoga Springs, NY (2009), CD-ROM
T.S. Bailey and R.D. Falgout, “Analysis of Massively Parallel Discrete-Ordinates Transport Sweep Algorithms with Collisions,” in Proc. International Conference on Mathematics, Computational Methods & Reactor Physics, May 3-7, 2009, Saratoga Springs, NY (2009), CD-ROM
T.S. Bailey, M.L. Adams, T.B. Yang, and M.R. Zika, “A Piecewise Linear Finite Element Discretization of the Diffusion Equation for Arbitrary Polyhedral Grids,” in Proc. ANS Topical Meeting Mathematical and Computation, Supercomputing Reactor Physics and Nuclear and Biological Applications, September 12-15, Avignon, France (2005), CD-ROM