Blow-up for the incompressible 3D-Euler equations with uniform C1,12-ε L2 force

Abstract

This paper presents a novel approach to establish a blow-up mechanism for the forced 3D incompressible Euler equations, with a specific focus on non-axisymmetric solutions. We construct solutions on R3 within the function space C3,12 L2 for the time interval [0, T), where T > 0 is finite, subject to a uniform force in C1,12 -ε L2. Remarkably, our methodology results in a blow-up: as the time t approaches the blow-up moment T, the integral ∫0t |∇ u| ds tends to infinity, all while preserving the solution's smoothness throughout, except at the origin. In the process of our blow-up construction, self-similar coordinates are not utilized and we are able to treat solutions beyond the C1,13+ threshold regularity of axy-symmetric solutions without swirl.