Sharp Uncertainty Principle inequality for solenoidal fields

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Contribution

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Abstract

This paper solves the $L^2$ version of Maz'ya's open problem (Integral Equations Operator Theory 2018) on the sharp uncertainty principle inequality \[\int_{\mathbb{R}^N}|\nabla {\bf\it u}|^2dx\int_{\mathbb{R}^N}|{\bf\it u}|^2|{\bf\it x}|^2dx\ge C_N\left(\int_{\mathbb{R}^N}|{\bf\it u}|^2dx\right)^2\] for solenoidal (namely divergence-free) vector fields ${\bf\it u}={\bf\it u}({\bf\it x})$ on $\mathbb{R}^N$. The best value of the constant turns out to be $C_N=\frac{1}{4}\left(\sqrt{N^2-4(N-3)}+2\right)^2$ which exceeds the original value $N^2/4$ for unconstrained fields. Moreover, we show the attainability of $C_N$ and specify the profiles of the extremal solenoidal fields: for $N\ge4$, the extremals are proportional to a poloidal field that is axisymmetric and unique up to the axis of symmetry; for $N=3$, there additionally exist extremal toroidal fields.