Existence and uniqueness of weak solutions of the compressible spherically symmetric Navier-Stokes equations

Abstract

One of the most influential fundamental tools in harmonic analysis is Riesz transform. It maps Lp functions to Lp functions for any p∈ (1,∞) which plays an important role in singular operators. As an application in fluid dynamics, the norm equivalence between \|∇ u\|Lp and \|div u\|Lp+\|curl u\|Lp is well established for p∈ (1,∞). However, since Riesz operators sent bounded functions only to BMO functions, there is no hope to bound \|∇ u\|L∞ in terms of \|div u\|L∞+\|curl u\|L∞. As pointed out by Hoff[ SIAM J. Math. Anal. 37(2006), No. 6, 1742-1760], this is the main obstacle to obtain uniqueness of weak solutions for isentropic compressible flows. Fortunately, based on new observations, see Lemma Riesz, we derive an exact estimate for \|∇ u\|L∞ (2+1/N)\|div u\|L∞ for any N-dimensional radially symmetric vector functions u. As a direct application, we give an affirmative answer to the open problem of uniqueness of some weak solutions to the compressible spherically symmetric flows in a bounded ball.