Andrew Christlieb
Affiliations: | Applied Mathematics | Michigan State University, East Lansing, MI |
Area:
Applied Mathematics, Computer Science, Electronics and Electrical EngineeringGoogle:
"Andrew Christlieb"Children
Sign in to add traineeMaureen M. Morton | grad student | 2010 | Michigan State |
David Lawlor | grad student | 2012 | Michigan State |
Gerard L. Van Groningen | grad student | 2012 | Michigan State |
Jaylan S. Jones | grad student | 2013 | Michigan State |
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Publications
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Crawford Z, Li J, Christlieb A, et al. (2020) Unconditionally Stable Time Stepping Method For Mixed Finite Element Maxwell Solvers Progress in Electromagnetics Research C. 103: 17-30 |
Choi B, Christlieb A, Wang Y. (2020) High-dimensional sparse Fourier algorithms Numerical Algorithms. 1-26 |
Christlieb AJ, Feng X, Seal DC, et al. (2016) A high-order positivity-preserving single-stage single-step method for the ideal magnetohydrodynamic equations Journal of Computational Physics. 316: 218-242 |
Christlieb A, Lawlor D, Wang Y. (2016) A multiscale sub-linear time Fourier algorithm for noisy data Applied and Computational Harmonic Analysis. 40: 553-574 |
Christlieb AJ, Gottlieb S, Grant Z, et al. (2016) Explicit Strong Stability Preserving Multistage Two-Derivative Time-Stepping Schemes Journal of Scientific Computing. 1-29 |
Christlieb AJ, Liu Y, Tang Q, et al. (2015) Positivity-preserving finite difference weighted ENO schemes with constrained transport for ideal magnetohydrodynamic equations Siam Journal On Scientific Computing. 37: A1825-A1845 |
Christlieb AJ, Güçlü Y, Seal DC. (2015) The picard integral formulation of weighted essentially nonoscillatory schemes Siam Journal On Numerical Analysis. 53: 1833-1856 |
Christlieb AJ, Liu Y, Xu Z. (2015) High order operator splitting methods based on an integral deferred correction framework Journal of Computational Physics. 294: 224-242 |
Christlieb AJ, Liu Y, Tang Q, et al. (2015) High order parametrized maximum-principle-preserving and positivity-preserving WENO schemes on unstructured meshes Journal of Computational Physics. 281: 334-351 |
Seal DC, Tang Q, Xu Z, et al. (2015) An Explicit High-Order Single-Stage Single-Step Positivity-Preserving Finite Difference WENO Method for the Compressible Euler Equations Journal of Scientific Computing. 1-20 |