Products of Composition and Differentiation between the Fractional Cauchy Spaces and the Bloch-Type Spaces

Abstract

The operators

D C_{Φ}

and

C_{Φ} D

are defined by

D C_{Φ} (f) = {(f \circ Φ)}^{'}

and

C_{Φ} D (f) = f^{'} \circ Φ

where

Φ

is an analytic self-map of the unit disc and

f

is analytic in the disc. A characterization is provided for boundedness and compactness of the products of composition and differentiation from the spaces of fractional Cauchy transforms

F_{α}

to the Bloch-type spaces

B^{β}

, where

α > 0

and

β > 0

. In the case

β < 2

, the operator

D C_{Φ} : F_{α} ⟶ B^{β}

is compact

\Leftrightarrow D C_{Φ} : F_{α} ⟶ B^{β}

is bounded

\Leftrightarrow Φ^{'} \in B^{β}, Φ Φ^{'} \in B^{β}

and

{‖Φ‖}_{\infty} < 1

. For

β < 1

C_{Φ} D : F_{α} ⟶ B^{β}

is compact

\Leftrightarrow C_{Φ} D : F_{α} ⟶ B^{β}

is bounded

\Leftrightarrow Φ \in B^{β}

and

{‖Φ‖}_{\infty} < 1

Authors

Hibschweiler, Rita

Status

published

Publication Date

May 10, 2021

Published In

Journal of Function Spaces Journal

Digital Object Identifier (doi)

https://doi.org/10.1155/2021/9991716

Start Page

End Page

Volume

2021