| [1] Chen G, Hoff D, Trivisa K. Global solutions of the compressible Navier-Stokes equations with large dis-
continuous initial data. Comm Partial Di?er Equ, 2000, 25(11/12): 2233–2257
[2] Fang D, Zhang T. Global solutions of the Navier-Stokes equations for compressible flow with density-
dependent viscosity and discontinuous initial data. J Di?er Equ, 2006, 222: 63–94
[3] Guo Z, Jiu Q, Xin Z. Spherically symmetric isentropic compressible flows with density-dependent viscosity
coe?cients. SIAM J Math Anal, 2008, 39(5): 1402–1427
[4] Ho? D.Constructin ofsolutionsforcompressible, isentropicNavier-Stokes equations inone space dimension
with nonsmooth initial data. Proc Roy Soc Edinburgh Sect, 1986, A103: 301–315
[5] Hoff D. Global existence for 1D, compressible, isentropic Navier-Stokes equations with large initial data.
Trans Amer Math Soc, 1987, 303(1): 169–181
[6] Hoff D. Global well-posedness of the Cauchy problem for nonisentropic gas dynamics with discontinuous
initial data. J Differ Equ, 1992, 95: 33–73
[7] Hoff D. Spherically symmetric solutions of the Navier-Stokes equations for compressible, isothermal flow
with large, discontinuous initial data. Indiana Univ Math J, 1992, 41: 1225–1302
[8] Ho? D. Global solutions of the Navier-Stokes equations for multidimensonal compressible flow with dis-
continuous initial data. J Differ Equ, 1995, 120: 215–254
[9] Hoff D. Strong convergence to global solutions for multidimensional flows of compressible, viscous fluids
with polytropic equations of state and discontinuous initial data. Arch Rational Mech Anal, 1995, 132: 1–14
[10] HoffD.Discontinuous solutionsoftheNavier-Stokes equations formultidimensionalflowsofheat-conducting
fluids. Arch Rational Mech Anal, 1997, 139(4): 303–354
[11] Hoff D. Dynamics of singularity surfaces for compressible, viscous flows in two space dimensions. Commu
Pure Appl Math, 2002, 55: 1365–1407
[12] Hoff D, Smoller J. Solutions in the large for certain nonlinear parabolic systems. Ann Inst H Poincar′e
Anal Non Lin′eaire 2, 1985, 3: 213–235
[13] Jiang S, Xin Z, Zhang P. Global weak solutions to 1D compressible isentropy Navier-Stokes with density-
dependent viscosity. Methods Appl Anal, 2005, 12(3): 239–252
[14] Jiu Q, Wang Y, Xin Z. Stability of rarefaction waves to the 1D compressible Navier-Stokes equations with
density-dependent viscosity. Comm Partial Differ Equ, 2011, 36(4): 602–634
[15] Li H, Li J, Xin Z. Vanishing of vacuum states and blow-up phenomena of the compressible Navier-Stokes
equations. Commu Math Phys, 2008, 281: 401–444
[16] Lian L, Guo Z, Li H. Dynamical behaviors of vacuum states for 1D compressible Navier-Stokes equations.
J Di?er Equ, 2010, 248(8): 1926–1954
[17] Liu T, Xin Z, Yang T. Vacuum states for compressible flow. Discrete Contin Dynam Systems, 1998, 4: 1–32
[18] Mellet A, Vasseur A. Existence and uniqueness of global strong solutions for one-dimensional compressible
Navier-Stokes equations. SIAM J Math Anal, 2008, 39: 1344–1365
[19] Matsumura A, Wang Y. Asymptotical stability of viscous shock wave for a one-dimensional isentropic
model for viscous gas with density-dependent viscosity. Methods Appl Anal, 2010, 17(3): 279–290
[20] Okada M, Neˇcaso′a S M, Makino T. Free boundary problem for the equationof one-dimensional motion of
compressible gas with density-dependent viscosity. Ann Univ Ferrara Sez, VII (N S), 2002, 48: 1–20
[21] Yang T, Yao Z, Zhu C. Compressible Navier-Stokes equations with density-dependent viscosity and vac-
uum. Comm Partial Di?er Equ, 2001, 26: 965–981
[22] Yang T, Zhao H. A vacuum problem for the one-dimensional compressible Navier-Stokes equations with
density-dependent viscosity. J Di?er Equ, 2002, 184: 163–184
[23] Yang T, Zhu C. Compressible Navier-Stokes equations with degenerate viscosity coe?cient and vacuum.
Commu Math Phys, 2002, 230: 329–363 |