On Hardy spaces associated with the twisted Laplacian and sharp estimates for the corresponding wave operator
Abstract
We prove various equivalent characterisations of the Hardy space HpL(Cn) for 0<p<1 associated with the twisted Laplacian L which generalises the result of [MPR81] for the case p=1. Using the atomic characterisation of HpL(Cn) corresponding to the twisted convolution, we prove sharp boundedness result for the wave operator L-δ/2e itL for a fixed t>0 on HpL(Cn). More precisely we prove that it is a bounded operator from HpL(Cn) to Lp(Cn) for 0<p≤ 1 and δ≥ (2n-1)(1/p-1/2).
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