Finite-time Singularity Formation for Strong Solutions to the $3D$ Euler Equations, I

TL;DR

This paper demonstrates finite-time singularity formation for certain axi-symmetric solutions to the 3D Euler equations with finite energy, using scale-invariant solutions and local well-posedness analysis.

Contribution

It introduces a method to prove finite-time singularities for finite-energy solutions by analyzing scale-invariant solutions and their cutoff modifications.

Findings

Finite-time singularity formation for scale-invariant solutions.

Finite-energy solutions can develop singularities in finite time.

Global regularity for non-swirling axi-symmetric solutions in similar domains.

Abstract

In this paper and the companion paper [EJE2], we establish finite-time singularity formation for finite-energy strong solutions to the axi-symmetric $3D$ Euler equations in the domain $\{(x,y,z)\in\mathbb{R}^3:z^2\leq c(x^2+y^2)\}$ for some $c>0$. In the spirit of our previous works, [EJSI] and [EJB], we do this by first studying scale-invariant solutions which satisfy a one dimensional PDE system and proving that they may become singular in finite time for properly chosen initial data. We then prove local well-posedness for the $3D$ Euler equations in a natural regularity class which includes scale-invariant solutions. While these solutions have uniformly bounded vorticity from time zero until right before the blow-up time, they do not have finite energy. To remedy this, we cut off the scale-invariant data to ensure finite energy and prove that the corresponding local solution must also become singular in finite time. This paper focuses only on the analysis of the scale-invariant solutions themselves and the proof that they can become singular in finite time. The local well-posedness theorem and the cut-off argument are very close to those in [JSI] and [EJB] and are left for the companion paper [EJE2]. It is important to remark that while the fluid domain is the exterior of a cone, we prove global regularity for the axi-symmetric $3D$ Euler equations without swirl in the exact same regularity classes and in the same domain. It is quite possible that the methods we use can be adapted to establish finite-time singularity formation for $C^\infty$ finite-energy solutions to the $3D$ Euler equations on $\mathbb{R}^3_+$.