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Optimal constants and extremisers for some smoothing estimates

arXiv:1206.5110

Abstract

We establish new results concerning the existence of extremisers for a broad class of smoothing estimates of the form $\|ψ(|\nabla|) \exp(itϕ(|\nabla|)f \|_{L^2(w)} \leq C\|f\|_{L^2}$, where the weight $w$ is radial and depends only on the spatial variable; such a smoothing estimate is of course equivalent to the $L^2$-boundedness of a certain oscillatory integral operator $S$ depending on $(w,ψ,ϕ)$. Furthermore, when $w$ is homogeneous, and for certain $(ψ,ϕ)$, we provide an explicit spectral decomposition of $S^*S$ and consequently recover an explicit formula for the optimal constant $C$ and a characterisation of extremisers. In certain well-studied cases when $w$ is inhomogeneous, we obtain new expressions for the optimal constant.

21 pages, statement of Theorem 1.6 fixed, further minor modifications, references added