Global regularity and incompressible limit of 2D compressible Navier-Stokes equations with large bulk viscosity

Abstract

In this paper, we study the global regularity of large solutions with vacuum to the two-dimensional compressible Navier-Stokes equations on T2=R2/Z2, when the volume (bulk) viscosity coefficient is sufficiently large. It firstly fixes a flaw in [Proposition 3.3]Danchin2023, which concerns the -independent global t-weighted estimates of the solutions. Amending the proof requires non-trivially mathematical analysis. As a by-product, the incompressible limit with an explicit rate of convergence is shown, when the volume viscosity tends to infinity. In contrast to [Theorem 1.3]Danchin2019 and [Corollary 1.1]DM2017 where vacuum was excluded, the convergence rate of the incompressible limit is obtained for the global solutions with vacuum, based on some t-growth and singular t-weighted estimates.