On the continuity of the solution map of the Euler-Poincaré equations in Besov spaces

Abstract: By constructing a series of perturbation functions through localization in the Fourier domain and translation, we show that the data-to-solution map for the Euler-Poincar\'e equations is nowhere uniformly continuous in $B^s_{p,r}(\mathbb{R} ^d)$ with $s>\max{1+\frac d2,\frac32}$ and $(p,r)\in (1,\infty)\times [1,\infty)$. This improves our previous result which shows the data-to-solution map for the Euler-Poincar\'e equations is non-uniformly continuous on a bounded subset of $B^s_{p,r}(\mathbb{R} ^d)$ near the origin.