Local cone multipliers and Cauchy-Szego projections in bounded symmetric domains
Abstract
We show that the cone multiplier satisfies local Lp-Lq bounds only in the trivial range 1≤ q≤ 2≤ p≤∞. To do so, we suitably adapt to this setting the proof of Fefferman for the ball multiplier. As a consequence we answer negatively a question by B\'ekoll\'e and Bonami (Colloq. Math. 68, 1995, 81-100), regarding the continuity from Lp Lq of the Cauchy-Szeg\"o projections associated with a class of bounded symmetric domains in Cn with rank r≥2.
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