Year |
Citation |
Score |
2019 |
Dolejší V, May G, Rangarajan A, Roskovec F. A Goal-Oriented High-Order Anisotropic Mesh Adaptation Using Discontinuous Galerkin Method for Linear Convection-Diffusion-Reaction Problems Siam Journal On Scientific Computing. 41. DOI: 10.1137/18M1172491 |
0.407 |
|
2019 |
Bartoš O, Dolejší V, May G, Rangarajan A, Roskovec F. A goal-oriented anisotropic hp-mesh adaptation method for linear convection–diffusion–reaction problems Computers & Mathematics With Applications. 78: 2973-2993. DOI: 10.1016/J.Camwa.2019.03.046 |
0.45 |
|
2018 |
Rangarajan A, Balan A, May G. Mesh Optimization for Discontinuous Galerkin Methods Using a Continuous Mesh Model Aiaa Journal. 56: 4060-4073. DOI: 10.2514/1.J056965 |
0.439 |
|
2018 |
Dolejší V, May G, Rangarajan A. A continuous hp-mesh model for adaptive discontinuous Galerkin schemes☆ Applied Numerical Mathematics. 124: 1-21. DOI: 10.1016/J.Apnum.2017.09.015 |
0.452 |
|
2017 |
Dolejší V, May G, Roskovec F, Solin P. Anisotropic hp-mesh optimization technique based on the continuous mesh and error models Computers & Mathematics With Applications. 74: 45-63. DOI: 10.1016/J.Camwa.2016.12.015 |
0.414 |
|
2016 |
May G, Zakerzadeh M. On the convergence of space-time discontinuous Galerkin schemes for scalar conservation laws? Siam Journal On Numerical Analysis. 54: 2452-2465. DOI: 10.1137/15M102438X |
0.393 |
|
2016 |
Zakerzadeh M, May G. On the convergence of a shock capturing discontinuous galerkin method for nonlinear hyperbolic systems of conservation laws Siam Journal On Numerical Analysis. 54: 874-898. DOI: 10.1137/14096503X |
0.416 |
|
2015 |
Balan A, Woopen M, May G. Adjoint-based hp-adaptivity on anisotropic meshes for high-order compressible flow simulations Computers and Fluids. DOI: 10.1016/J.Compfluid.2016.03.029 |
0.456 |
|
2015 |
Gerhard N, Iacono F, May G, Müller S, Schäfer R. A High-Order Discontinuous Galerkin Discretization with Multiwavelet-Based Grid Adaptation for Compressible Flows Journal of Scientific Computing. 62: 25-52. DOI: 10.1007/S10915-014-9846-9 |
0.413 |
|
2014 |
Schütz J, May G. An adjoint consistency analysis for a class of hybrid mixed methods Ima Journal of Numerical Analysis. 34: 1222-1239. DOI: 10.1093/Imanum/Drt036 |
0.456 |
|
2014 |
Woopen M, Balan A, May G, Schütz J. A comparison of hybridized and standard DG methods for target-based hp-adaptive simulation of compressible flow Computers and Fluids. 98: 3-16. DOI: 10.1016/J.Compfluid.2014.03.023 |
0.469 |
|
2014 |
Woopen M, May G, Schütz J. Adjoint-based error estimation and mesh adaptation for hybridized discontinuous Galerkin methods International Journal For Numerical Methods in Fluids. 76: 811-834. DOI: 10.1002/Fld.3959 |
0.461 |
|
2013 |
Schütz J, Noelle S, Steiner C, May G. A note on adjoint error estimation for one-dimensional stationary balance laws with shocks Siam Journal On Numerical Analysis. 51: 126-136. DOI: 10.1137/120870335 |
0.336 |
|
2013 |
Schütz J, May G. A hybrid mixed method for the compressible Navier-Stokes equations Journal of Computational Physics. 240: 58-75. DOI: 10.1016/J.Jcp.2013.01.019 |
0.462 |
|
2012 |
Balan A, May G, Schöberl J. A stable high-order Spectral Difference method for hyperbolic conservation laws on triangular elements Journal of Computational Physics. 231: 2359-2375. DOI: 10.1016/J.Jcp.2011.11.041 |
0.443 |
|
2011 |
May G. On the Connection Between the Spectral Difference Method and the Discontinuous Galerkin Method Communications in Computational Physics. 9: 1071-1080. DOI: 10.4208/Cicp.090210.040610A |
0.337 |
|
2010 |
May G, Iacono F, Jameson A. A hybrid multilevel method for high-order discretization of the Euler equations on unstructured meshes Journal of Computational Physics. 229: 3938-3956. DOI: 10.1016/J.Jcp.2010.01.036 |
0.457 |
|
2007 |
May G, Srinivasan B, Jameson A. An improved gas-kinetic BGK finite-volume method for three-dimensional transonic flow Journal of Computational Physics. 220: 856-878. DOI: 10.1016/J.Jcp.2006.05.027 |
0.458 |
|
2007 |
Wang ZJ, Liu Y, May G, Jameson A. Spectral Difference Method for Unstructured Grids II: Extension to the Euler Equations Journal of Scientific Computing. 32: 45-71. DOI: 10.1007/S10915-006-9113-9 |
0.469 |
|
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