A Mikhlin--H\"ormander multiplier theorem for the partial harmonic oscillator
classification
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keywords
multiplierharmonicmathbbmikhlin--hormanderoscillatorpartialtheorem
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We prove a Mikhlin--H\"ormander multiplier theorem for the partial harmonic oscillator $H_{\textup{par}}=-\pa_\rho^2-\Delta_x+|x|^2$ for $(\rho, x)\in\R\times\R^d$ by using the Littlewood--Paley $g$ and $g^\ast$ functions and the associated heat kernel estimate. The multiplier we have investigated is defined on $\mathbb R \times \mathbb N$.
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