Bounds on the Hermite spectral projection operator
Abstract
We study Lp-Lq bounds on the spectral projection operator λ associated to the Hermite operator H=|x|2- in Rd. We are mainly concerned with a localized operator EλE for a subset E⊂ Rd and undertake the task of characterizing the sharp Lp--Lq bounds. We obtain sharp bounds in extended ranges of p,q. First, we provide a complete characterization of the sharp Lp--Lq bounds when E is away from λ Sd-1. Secondly, we obtain the sharp bounds as the set E gets close to λ Sd-1. Thirdly, we extend the range of p,q for which the operator λ is uniformly bounded from Lp( Rd) to Lq( Rd).
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