Year |
Citation |
Score |
2020 |
Gie G, Jung C, Lee H. Enriched Finite Volume Approximations of the Plane-Parallel Flow at a Small Viscosity Journal of Scientific Computing. 84: 1-26. DOI: 10.1007/S10915-020-01259-0 |
0.605 |
|
2019 |
Gie G, Jung C, Nguyen TB. Validation of a 2D cell-centered Finite Volume method for elliptic equations Mathematics and Computers in Simulation. 165: 119-138. DOI: 10.1016/J.Matcom.2019.03.008 |
0.617 |
|
2017 |
Cozzi E, Gie G, Kelliher JP. The aggregation equation with Newtonian potential: The vanishing viscosity limit Journal of Mathematical Analysis and Applications. 453: 841-893. DOI: 10.1016/J.Jmaa.2017.04.009 |
0.51 |
|
2016 |
Gie G, Henderson C, Iyer G, Kavlie L, Whitehead JP. Stability of vortex solutions to an extended Navier–Stokes system Communications in Mathematical Sciences. 14: 1773-1797. DOI: 10.4310/Cms.2016.V14.N7.A1 |
0.556 |
|
2016 |
Gie GM, Jung CY, Temam R. Recent progresses in boundary layer theory Discrete and Continuous Dynamical Systems- Series A. 36: 2521-2583. DOI: 10.3934/Dcds.2016.36.2521 |
0.688 |
|
2014 |
Gie G. Asymptotic expansion of the stokes solutions at small viscosity: The case of non-compatible initial data Communications in Mathematical Sciences. 12: 383-400. DOI: 10.4310/Cms.2014.V12.N2.A8 |
0.378 |
|
2014 |
Bousquet A, Gie GM, Hong Y, Laminie J. A higher order Finite Volume resolution method for a system related to the inviscid primitive equations in a complex domain Numerische Mathematik. 128: 431-461. DOI: 10.1007/S00211-014-0622-4 |
0.518 |
|
2013 |
Gie G, Jung C. Vorticity layers of the 2D Navier-Stokes equations with a slip type boundary condition Asymptotic Analysis. 84: 17-33. DOI: 10.3233/Asy-131164 |
0.697 |
|
2013 |
Gie G, Jung C, Temam R. Analysis of Mixed Elliptic and Parabolic Boundary Layers with Corners International Journal of Differential Equations. 2013: 1-13. DOI: 10.1155/2013/532987 |
0.699 |
|
2013 |
Song L, Gie G, Shiue M. Interior penalty discontinuous Galerkin methods with implicit time‐integration techniques for nonlinear parabolic equations Numerical Methods For Partial Differential Equations. 29: 1341-1366. DOI: 10.1002/Num.21758 |
0.613 |
|
2012 |
Gie G, Hamouda M, Temam R. Asymptotic analysis of the Navier-Stokes equations in a curved domain with a non-characteristic boundary Networks and Heterogeneous Media. 7: 741-766. DOI: 10.3934/Nhm.2012.7.741 |
0.661 |
|
2012 |
Gie GM, Kelliher JP. Boundary layer analysis of the Navier-Stokes equations with generalized Navier boundary conditions Journal of Differential Equations. 253: 1862-1892. DOI: 10.1016/J.Jde.2012.06.008 |
0.543 |
|
2010 |
Gie G, Hamouda M, Temam R. Asymptotic analysis of the Stokes problem on general bounded domains: the case of a characteristic boundary Applicable Analysis. 89: 49-66. DOI: 10.1080/00036810903437796 |
0.67 |
|
2009 |
Gie G, Hamouda M, Témam R. Boundary layers in smooth curvilinear domains: Parabolic problems Discrete and Continuous Dynamical Systems. 26: 1213-1240. DOI: 10.3934/Dcds.2010.26.1213 |
0.658 |
|
2009 |
Gie G. Singular perturbation problems in a general smooth domain Asymptotic Analysis. 62: 227-249. DOI: 10.3233/Asy-2009-0922 |
0.536 |
|
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