Small Hankel operators on generalized Fock spaces
Abstract
We consider Fock spaces Fp,α of entire functions on C associated to the weights e-α |z|2, where α>0 and is a positive integer. We compute explicitly the corresponding Bergman kernel associated to F2,α and, using an adequate factorization of this kernel, we characterize the boundedness and the compactness of the small Hankel operator hb,α on Fp,α. Moreover, we also determine when hb,α is a Hilbert-Schmidt operator on F2,α.
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