Showing results 23 to 35 of 35
INVISCID LIMIT TO THE SHOCK WAVES FOR THE FRACTAL BURGERS EQUATION Akopian, Sona; Kang, Moon-Jin; Vasseur, Alexis, COMMUNICATIONS IN MATHEMATICAL SCIENCES, v.18, no.6, pp.1477 - 1491, 2020-11 |
L-2-contraction for shock waves of scalar viscous conservation laws Kang, Moon-Jin; Vasseur, Alexis F., ANNALES DE L INSTITUT HENRI POINCARE-ANALYSE NON LINEAIRE, v.34, no.1, pp.139 - 156, 2017-01 |
L-2-contraction of large planar shock waves for multi-dimensional scalar viscous conservation laws Kang, Moon-Jin; Vasseur, Alexis F.; Wang, Yi, JOURNAL OF DIFFERENTIAL EQUATIONS, v.267, no.5, pp.2737 - 2791, 2019-08 |
L-2-type contraction for shocks of scalar viscous conservation laws with strictly convex flux Kang, Moon-Jin, JOURNAL DE MATHEMATIQUES PURES ET APPLIQUEES, v.145, pp.1 - 43, 2021-01 |
LARGE-TIME BEHAVIOR OF COMPOSITE WAVES OF VISCOUS SHOCKS FOR THE BAROTROPIC NAVIER-STOKES EQUATIONS Han, Sungho; Kang, Moon-Jin; Kim, Jeongho, SIAM JOURNAL ON MATHEMATICAL ANALYSIS, v.55, no.5, pp.5526 - 5574, 2023-10 |
NON-CONTRACTION OF INTERMEDIATE ADMISSIBLE DISCONTINUITIES FOR 3-D PLANAR ISENTROPIC MAGNETOHYDRODYNAMICS Kang, Moon-Jin, KINETIC AND RELATED MODELS, v.11, no.1, pp.107 - 118, 2018-02 |
ON THE BASIN OF ATTRACTORS FOR THE UNIDIRECTIONALLY COUPLED KURAMOTO MODEL IN A RING Ha, Seung-Yeal; Kang, Moon-Jin, SIAM JOURNAL ON APPLIED MATHEMATICS, v.72, no.5, pp.1549 - 1574, 2012-10 |
PROPAGATION OF THE MONO-KINETIC SOLUTION IN THE CUCKER-SMALE-TYPE KINETIC EQUATIONS Kang, Moon-Jin; Kim, Jeongho, COMMUNICATIONS IN MATHEMATICAL SCIENCES, v.18, no.5, pp.1221 - 1231, 2020-09 |
Time-asymptotic interaction of flocking particles and an incompressible viscous fluid Bae, Hyeong-Ohk; Choi, Young-Pil; Ha, Seung-Yeal; Kang, Moon-Jin, NONLINEARITY, v.25, no.4, 2012-04 |
Time-asymptotic stability of composite waves of viscous shock and rarefaction for barotropic Navier-Stokes equations Kang, Moon-Jin; Vasseur, Alexis F.; Wang, Yi, ADVANCES IN MATHEMATICS, v.419, 2023-04 |
Uniqueness and stability of entropy shocks to the isentropic Euler system in a class of inviscid limits from a large family of Navier-Stokes systems Kang, Moon-Jin; Vasseur, Alexis F., INVENTIONES MATHEMATICAE, v.224, no.1, pp.55 - 146, 2021-04 |
Uniqueness of a Planar Contact Discontinuity for 3D Compressible Euler System in a Class of Zero Dissipation Limits from Navier-Stokes-Fourier System Kang, Moon-Jin; Vasseur, Alexis F.; Wang, Yi, COMMUNICATIONS IN MATHEMATICAL PHYSICS, v.384, no.3, pp.1751 - 1782, 2021-06 |
Well-posedness of the Riemann problem with two shocks for the isentropic Euler system in a class of vanishing physical viscosity limits Kang, Moon-Jin; Vasseur, Alexis F., JOURNAL OF DIFFERENTIAL EQUATIONS, v.338, pp.128 - 226, 2022-11 |
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