Author:
Yang Xueyan,He Hua,Tong Cezhong,Arroussi Hicham
Abstract
AbstractOn the Fock–Sobolev spaces, we study the range of Volterra inner derivations and composition inner derivations. The Volterra inner derivation ranges in the ideal of compact operators if and only if the induced function g is a linear polynomial. The composition inner derivation ranges in the ideal of compact operators if and only if the induced function $$\varphi $$
φ
is either identity or a contractive linear self-mapping of $$\mathbb {C}$$
C
. Moreover, we describe the compact intertwining relations for composition operators and Volterra operators between different Fock–Sobolev spaces. In this paper, our results are complement and in a sense extend some aspects of Calkin’s result (Ann Math 42:839–873, 1941) to the algebras of bounded linear operators on Fock–Sobolev spaces.
Funder
the National Natural Science Foundations of China
Natural Science Foundation of Hebei Province
Natural Science Foundation of Tianjin City
European Union’s Horizon 2022 research and innovation programme under the Marie Skłodowska-Curie
Publisher
Springer Science and Business Media LLC
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