On the regularity of the De Gregorio model for the 3D Euler equations

Abstract

We study the regularity of the De Gregorio (DG) model ωt + uωx = ux ω on S1 for initial data ω0 with period π and in class X: ω0 is odd and ω0 ≤ 0 (or ω0 ≥ 0) on [0,π/2]. These sign and symmetry properties are the same as those of the smooth initial data that lead to singularity formation of the De Gregorio model on R or the generalized Constantin-Lax-Majda (gCLM) model on R or S1 with a positive parameter. Thus, to establish global regularity of the DG model for general smooth initial data, which is a conjecture on the DG model, an important step is to rule out potential finite time blowup from smooth initial data in X. We accomplish this by establishing a one-point blowup criterion and proving global well-posedness for initial data ω0 ∈ H1 X with ω0(x) x-1 ∈ L∞. On the other hand, for any α ∈ (0,1), we construct a finite time blowup solution from a class of initial data with ω0 ∈ Cα C∞(S1 \0\) X. Our results imply that singularities developed in the DG model and the gCLM model on S1 can be prevented by stronger advection.