Abstract
We generalize several results on Toeplitz operators over reflexive, standard weighted Fock spaces F_t^p to the non-reflexive cases p = 1, \infty . Among these results are the characterization of compactness and the Fredholm property of such operators, a well-known representation of the Toeplitz algebra, and a characterization of the essential center of the Toeplitz algebra. Further, we improve several results related to correspondence theory, e.g., we improve previous results on the correspondence of algebras and we give a correspondence theoretic version of the well-known Berger–Coburn estimates.
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