Global Well-Posedness of Classical Solutions to the Multi-Dimensional Degenerate Compressible Navier-Stokes Equations with Large Spherically Symmetric Initial Data

Abstract

This paper is concerned with the global existence and uniqueness of classical solutions to the barotropic compressible Navier-Stokes equations with degenerate viscosity coefficients in three-dimensional bounded domains or in the whole space RN (N=2,3) with non-vacuum far-field density. Specifically, we assume that the shear viscosity coefficient μ()=α and the bulk viscosity coefficient λ()=(α-1)α, which satisfy the BD entropy relation. For arbitrarily large spherically symmetric initial data, we establish the global existence and uniqueness of spherically symmetric classical solutions under the following conditions: for N=2, α ∈ (0.54369,1) and γ ∈ (1,∞); for N=3 (both bounded domains and the whole space), α ∈ (0.67661,1) and γ ∈ (1,6α-3). In the two-dimensional case R2, the restriction on α can be further relaxed to α ∈ (9-62,1) provided that the initial data satisfy additional weighted integrability conditions. Moreover, we show that the solution will not exhibit vacuum in any finite time provided that no vacuum is present initially.