Endpoint eigenfunction bounds for the Hermite operator
Abstract
We establish the optimal Lp, p=2(d+3)/(d+1), eigenfunction bound for the Hermite operator H=-+|x|2 on Rd. Let λ denote the projection operator to the vector space spanned by the eigenfunctions of H with eigenvalue λ. The optimal L2--Lp bounds on λ, 2 p ∞, have been known by the works of Karadzhov and Koch-Tataru except p=2(d+3)/(d+1). For d 3, we prove the optimal bound for the missing endpoint case. Our result is built on a new phenomenon: improvement of the bound due to asymmetric localization near the sphere λ Sd-1.
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