Marc Magaña
Published 2024-10-24Version 1
We prove that the solution map for a family of non-linear transport equations in $\mathbb{R}^n$, with a velocity field given by the convolution of the density with a kernel that is smooth away from the origin and homogeneous of degree $-(n-1)$, is continuous in both the little H\"older class and the little Zygmund class. For particular choices of the kernel, one recovers well-known equations such as the 2D Euler or the 3D quasi-geostrophic equations.
Logarithmic spikes of gradients and uniqueness of weak solutions to a class of active scalar equations
Unified theory on V-states structures for active scalar equations
On well-posedness of a mildly dissipative family of active scalar equations in borderline Sobolev spaces
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