On the Slightly Perturbed De Gregorio Model on S1

Abstract

It is conjectured that the generalization of the Constantin-Lax-Majda model (gCLM) ωt + a uωx = ux ω due to Okamoto, Sakajo and Wunsch can develop a finite time singularity from smooth initial data for a < 1. For the endpoint case where a is close to and less than 1, we prove finite time asymptotically self-similar blowup of gCLM on a circle from a class of smooth initial data. For the gCLM on a circle with the same initial data, if the strength of advection a is slightly larger than 1, we prove that the solution exists globally with || ω(t)||H1 decaying in a rate of O(t-1) for large time. The transition threshold between two different behaviors is a=1, which corresponds to the De Gregorio model.