Absolutely summing Hankel operators on Fock spaces and the Berger-Coburn phenomenon
Abstract
In this paper, for 1 ≤ p, r < ∞ we characterize those symbols f so that the induced Hankel operators Hf are r-summing from Fock spaces Fpα to Lpα. The main result shows that the r-summing norm of Hf is equivalent to the IDA, p-norm of f, where is a positive number determined by p and r, and the IDA space is as in [13]. As some application, we discuss the Berger-Coburn phenomenon for r-summing Hankel operators on Fock spaces.
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