Vorticity blowup in compressible Euler equations in Rd, d ≥ 3

Abstract

We prove finite-time vorticity blowup in the compressible Euler equations in Rd for any d ≥ 3, starting from smooth, localized, and non-vacuous initial data. This is achieved by lifting the vorticity blowup result from [CCSV24] in R2 to Rd and utilizing the axisymmetry in Rd. At the time of the first singularity, both vorticity blowup and implosion occur on a sphere Sd-2. Additionally, the solution exhibits a non-radial implosion, accompanied by a stable swirl velocity that is sufficiently strong to initially dominate the non-radial components and to generate the vorticity blowup.