| [1] Kawashima S, Kurata K. Hardy type inequality and application to the stability of degenerate stationary waves. J Funct Anal, 2009, 257: 1–19
[2] Kagei Y, Kawashima S. Stability of planar stationary solutions to the compressible Navier-Stokes equation on the half space. Commun Math Phys, 2006, 266: 401–430
[3] Kawashima S, Nishibata S, Nishikawa M. Lp energy method for multi-dimensional viscous conservation laws and application to the stability of planar waves. J Hyperbolic Differ Equ, 2004, 1: 581–603
[4] Liu T P, Matsmura A, Nishihara K. Behavior of solutions for the Burgers equations with boundary corre-sponding to rarefaction waves. SIAM J Math Anal, 1998, 29: 293–308
[5] Nakamura M, Nishibata S, Yuge T. Convergence rate of solutions toward stationary solutions to the compressible Navier-Stokes equations in a half line. J Differ Equ, 2007, 241(1): 94–111
[6] Ueda Y. Asymptotic stability of the stationary solution for damped wave equations with a nonlinear convection term. Adv Math Sci Appl, 2008, 18(1): 329–343
[7] Ueda Y, Nakamura T, Kawashima S. Stability of planar stationary waves for damped wave equations with nonlinear convection in multi-dimensional half space. Kinetic Related Models, 2008, 1: 49–64
[8] Ueda Y, Nakamura T, Kawashima S. Stability of degenerate stationary waves for viscious gas. Arch Rational Mech Anal, 2010, 198(3): 735–762
[9] Yin H, Zhao H J, Kim J. Convergence rates of solutions toward boundary layer solutions for generalized Benjamin-Bona-Mahony-Burgers equations in the half-space. J Differ Equ, 2008, 245: 3144–3216
[10] Yin H, Zhao H J. Nonlinear stability of boundary layer solutions for generalized Benjamin-Bona-Mahony-Burgers equation in the half space. Kinetic Related Models, 2009, 2(3): 521–550 |