Non-uniqueness of H\"older continuous solutions for Inhomogeneous Incompressible Euler flows
Abstract
We consider the inhomogeneous (or density dependent) incompressible Euler equations in a three-dimensional periodic domain. We construct density and velocity u such that, for any α<1/7, both of them are α -H\"older continuous and (, u) is a weak solution to the underlying equations. The proof is based on typical convex integration techniques using Mikado flows as building blocks. As a main novelty with respect to the related literature, our result produces a H\"older continuous density.
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