Localization and compactness of Operators on Fock Spaces

Abstract

For 0<p≤∞, let Fp be the Fock space induced by a weight function satisfying ddc ω0. In this paper, given p∈ (0, 1] we introduce the concept of weakly localized operators on Fp, we characterize the compact operators in the algebra generated by weakly localized operators. As an application, for 0<p<∞ we prove that an operator T in the algebra generated by bounded Toeplitz operators with BMO symbols is compact on Fp if and only if its Berezin transform satisfies certain vanishing property at ∞. In the classical Fock space, we extend the Axler-Zheng condition on linear operators T, which ensures T is compact on Fpα for all possible 0<p<∞.