Semyon Tsynkov
Affiliations: | North Carolina State University, Raleigh, NC |
Area:
Applied Mathematics, Electronics and Electrical Engineering, Remote Sensing, General PhysicsGoogle:
"Semyon Tsynkov"
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Publications
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Medvinsky M, Tsynkov S, Turkel E. (2019) Direct implementation of high order BGT artificial boundary conditions Journal of Computational Physics. 376: 98-128 |
Smith F, Tsynkov S, Turkel E. (2019) Compact High Order Accurate Schemes for the Three Dimensional Wave Equation Journal of Scientific Computing. 81: 1181-1209 |
Petropavlovsky SV, Tsynkov S, Turkel E. (2018) A method of boundary equations for unsteady hyperbolic problems in 3D Journal of Computational Physics. 365: 294-323 |
Britt S, Tsynkov S, Turkel E. (2018) Numerical solution of the wave equation with variable wave speed on nonconforming domains by high-order difference potentials Journal of Computational Physics. 354: 26-42 |
Britt S, Turkel E, Tsynkov S. (2018) A High Order Compact Time/Space Finite Difference Scheme for the Wave Equation with Variable Speed of Sound Journal of Scientific Computing. 76: 777-811 |
Petropavlovsky SV, Tsynkov S. (2017) Non-deteriorating time domain numerical algorithms for Maxwell's electrodynamics Journal of Computational Physics. 336: 1-35 |
Magura S, Petropavlovsky S, Tsynkov S, et al. (2017) High-order numerical solution of the Helmholtz equation for domains with reentrant corners Applied Numerical Mathematics. 118: 87-116 |
Medvinsky M, Tsynkov S, Turkel E. (2016) Solving the Helmholtz equation for general smooth geometry using simple grids Wave Motion. 62: 75-97 |
Gilman M, Tsynkov S. (2015) A mathematical model for SAR imaging beyond the first born approximation Siam Journal On Imaging Sciences. 8: 186-225 |
Britt S, Petropavlovsky S, Tsynkov S, et al. (2015) Computation of singular solutions to the Helmholtz equation with high order accuracy Applied Numerical Mathematics. 93: 215-241 |