Woohyu Jeon
Published 2023-12-01Version 1
Drivas-Elgindi-La \cite{Drivas-Propagation} showed that when a radial loglog vortex is perturbed with bounded function, the solution maintains its structure all time, i.e., the solution can be written in the form of moving loglog vortex with bounded correction term. In this paper, we show that if the loglog vortex is perturbed with H\"older continuous function, then the solution loses its structure instantaneously: The solution could not be written in the form of loglog vortex with H\"older continuous correction term whose norm is uniformly bounded in time interval $[0,T]$ for any $T>0$. This breakdown of H\"older continuity still occurs even when the perturbation is smooth.
Traveling waves near Couette flow for the 2D Euler equation
On the asymptotic behavior of solutions of the 2d Euler equation
Hölder continuity of velocity gradients for shear-thinning fluids under perfect slip boundary conditions
![QR code for arXiv:2312.00546 [math.AP]](http://oss.arxitics.com/images/favicon.svg)