Asymptotically Self-Similar Blowup for 3D Incompressible Euler with C1, 1/3- Velocity I: C∞ 1D Limiting Profiles

Abstract

We consider a one-parameter family of 1D models for the 3D axisymmetric incompressible Euler equation with Cα vorticity and without swirl near the symmetry axis. For α= 13, we impose a crucial normalization and construct a C∞ self-similar blowup profile with unbounded 1D stream function and infinite spatial blowup rate, using a fixed-point argument around a numerically constructed approximate profile. For α< 13 sufficiently close to 13, we perturb the 13-profile and analytically construct exact smooth 1D profiles with bounded stream function and finite spatial blowup rate. In the companion work~chen2026eulerII, for any α∈ (0,13), we lift these 1D blowup profiles to construct exact C1,α self-similar blowup profiles for 3D Euler, and build on them to prove sharp asymptotically self-similar blowup for 3D axisymmetric Euler without swirl from Ccα initial vorticity and C1,α L2 initial velocity.