Nuclear Toeplitz operators between Fock spaces
Abstract
We characterize the nuclearity of Toeplitz operators Tμ: Fαp Fαq with Borel measure symbols for 1≤ p,q≤ ∞. For positive measures μ and q≤ p, we provide necessary and sufficient conditions in terms of the Berezin transform and establish a rigidity property for nuclearity across this range. In the case p<q, we obtain separate necessary and sufficient conditions, indicating that the Berezin transform alone is insufficient for a complete characterization. Our results extend to Fock spaces on Cn.
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