TY - JOUR

T1 - Correspondence theory on p-Fock spaces with applications to Toeplitz algebras

AU - Fulsche, Robert

N1 - Publisher Copyright: © 2020 Elsevier Inc.

PY - 2020/10/15

Y1 - 2020/10/15

N2 - We prove several results concerning the theory of Toeplitz algebras over p-Fock spaces using a correspondence theory of translation invariant symbol and operator spaces. The most notable results are: The full Toeplitz algebra is the norm closure of all Toeplitz operators with bounded uniformly continuous symbols. This generalizes a result obtained by J. Xia [25] in the case p=2, which was proven by different methods. Further, we prove that every Toeplitz algebra which has a translation invariant C⁎ subalgebra of the bounded uniformly continuous functions as its set of symbols is linearly generated by Toeplitz operators with the same space of symbols.

AB - We prove several results concerning the theory of Toeplitz algebras over p-Fock spaces using a correspondence theory of translation invariant symbol and operator spaces. The most notable results are: The full Toeplitz algebra is the norm closure of all Toeplitz operators with bounded uniformly continuous symbols. This generalizes a result obtained by J. Xia [25] in the case p=2, which was proven by different methods. Further, we prove that every Toeplitz algebra which has a translation invariant C⁎ subalgebra of the bounded uniformly continuous functions as its set of symbols is linearly generated by Toeplitz operators with the same space of symbols.

KW - Fock spaces

KW - Toeplitz algebras

U2 - 10.48550/arXiv.1911.12668

DO - 10.48550/arXiv.1911.12668

M3 - Article

AN - SCOPUS:85085743482

VL - 279

JO - Journal of functional analysis

JF - Journal of functional analysis

SN - 0022-1236

IS - 7

M1 - 108661

ER -