Boundedness of the orthogonal projection on Harmonic Fock spaces
Abstract
The main result of this paper refers to the boundedness of the orthogonal projection Pα:L2(Rn,dμα)→ Hα2, n≥2 associated to the harmonic Fock space Hα2, where dμα(x)=(πα)-n/2e-|x|2αdx. We prove that the operator Pα is not bounded on Lp(Rn,dμβ) when 0<p< 1 and we found a necessary and sufficient condition for the boundedness when 1≤ p<∞ and n is an even integer.
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